Diktat Kuliah s2 Analisis Real

November 23, 2018 | Author: Onny Khaeroni | Category: N/A

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Diktat Kuliah Analisis Real S2 Matematika Terapan IPB. The www.khaeroni.net is not mine anymore. Visit my new blog at h...

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Kfkecscs ]oke

@hkorlfc, ^.^c lffy\;;\13Bykhll.nli

Ecsofsc Alùiof4 Ecsofsc Alùiof4 Nlpyeojt lf Nlpyeojt lf `hkorlfc.fot ôeuruh alùiof ac `hkorlfc.fot ac `hkorlfc.fot akpkt acgufk`kf, akpkt acgufk`kf, acilacjc`ksc akf acsomkr`kf sonkrk momks uftu` tudukf mu`kf `liorscke (flfprljct) `liorscke (flfprljct) ktku k`kaoics (òfkc`kf pkfg`kt, pkfg`kt, sortcjc`ksc, akf somkgkcfyk). Acmleoh`kf ioekù`kf pofuecskf pofuecskf uekfg, aofgkf tkfpk iofakpkt`kf cdcf toreomch akhueu akrc `hkorlfc.fot. @krofk scjktfyk mu`kf rojorofsc, ik`k acporòfkf`kf dugk uftu` tcak` uftu` tcak` iofyortk`kf ecf` akrc ecf` akrc alùiof alùiof cfc.

Qoftkfg Alùiof4 Alùiof cfc acmukt cfc acmukt uftu` òpoftcfgkf prcmkac akf prcmkac akf glelfgkf, sohcfggk sogkek òskekhkf akf ‘òtorsosktkf– ykfg ack`cmkt`kf leoh pofggu leoh pofggufkkf fkkf alùiof cfc, pofuecs cfc, pofuecs tcak` mortkfggufg dkwkm. @otorsoackkffyk ac cftorfot ac cftorfot mu`kf morkrtc actudu`kf morkrtc actudu`kf uftu`  pofggufkkf pofggufkkf uiui, òtorsoackkf torsomut acik`sua`kf somkgkc alùioftksc lf‒ecfo ykfg acicec`c  pofuecs acicec`c  pofuecs akf acpormleoh`kf acicec`c leoh sckpk skdk. Quecskf cfc iorupk`kf cfc iorupk`kf skecfkf uekfg akrc nktktkf akrc nktktkf porùeckhkf porùeckhkf Kfkecscs Kfkecscs ]oke ac ]oke ac Cfstctut Cfstctut Rortkfckf Mlglr ô`lekh Mlglr ô`lekh Rksnkskrdkfk Rrlgrki Ikgcstor ^kcfs Ikylr Iktoiktc`k Ikylr Iktoiktc`k Qorkpkf ykfg ackipu leoh Mkpk` Ar. Dkhkrua Ar. Dkhkruaacf, acf, I^ akf Cmu Moreckf (Mu Kfggc) (Mu Kfggc)

Lutecfo4 ;. =. >. 1. ?. :.

Qolrc Hcipufkf Qolrc Hcipufkf ^cstoi Mcekfgkf ]oke _ùrkf Eomosguo Cftogrke Eomosguo Qurufkf akf Cftogrke ]ukfg Mkfknh

]ojorofsc4 ;. H.E. ]lyaof, ;388, ]oke  Kfkeyscs, ]oke  Kfkeyscs, In. Icekf Rum, Fow Slr` Fow Slr` =. Mkrteo, ].G., & A.]. ^hormort, =222, Cftrlauntclf tl ]oke  Kfkeyscs, ]oke  Kfkeyscs, Dlhf Dlhf Wceoy, Fow Slr` Fow Slr` >. Gleamorg, ]cnhkra ]., ;37:, Iothlas lj ]oke lj ]oke  Kfkeyscs, Kfkeyscs, Dlhf Dlhf Wceoy, Fow Slr` Fow Slr`

Qhkf`–s Ql4 Keekh swt ktks swt ktks hcakykh ‒Fyk akf fcìkt wk`tu eukfg, Fkmc Iuhkiika Fkmc Iuhkiika skw ktks skw ktks mcimcfgkf moecku iofgofke`kf `ctk òpkak rkmm `ctk. Mkpk` Ar. Dkhkruaa Ar. Dkhkruaacf, cf, I^ akf Cmu Kfggc. Cmu Kfggc. ]o`kf‒ro`kf sofkscm akf sopofaorctkkf iofghkakpc Kfkecscs ]oke akf ]oke akf Kedkmkr Kedkmkr Ecfokr. Ecfokr. Iy Qcfy Iy Qcfy Wom Wom ^cto, Iy Wlfaorjuee Iy Wlfaorjuee ekptlp ykfg skfgkt sotck. ôrtk Ke ôrtk Ke ‒Hkjcaz Iufsykrc ]ksyca ykfg sofkftcksk iofoikfc toecfgk cfc aofgkf cfc aofgkf ekftufkf kykt ‒kykt ‒Fyk ykfg iofggugkh soikfgkt. Akf tk` eupk, Cstrc ‒ù torncftk akf ùskykfgc ktks auùfgkffyk.

Mkgc sotckp ecskf ykfg toekh torùfnc, mkh`kf skipkc òpkak hktcfyk…Ik`k czcf`kf akf mckr`kfekh soeoimkr pofgkaukf cfc iofdkac `ktk ikkj ykfg skfgkt tueus…Fkiuf, dc`k ck torekimkt, ik`k mckr`kfekh eoimkrkf cfc hkfyk iofdkac mkrcs ykfg ioiporcfakh òrkfdkfg skipkh. Gufk`kfekh, dc`k ck moròfkf ioikkj`kf…akf mukfgekh, dc`k ioikfg tcak` moròfkf…

Mkm ; Qolrc Hcipufkf Hcipufkf ;.;.

Rofakhueukf ^kekh sktu akrc so`ckf mkfyk` kekt-kekt ykfg poftcfg akeki iktoiktc`k ilaorf kakekh iofgofkc tolrc hcipufkf. Akeki tuecskf cfc, dc`k actuecs`kf hcipufkf X , ik`k ykfg acik`sua kakekh hcipufkf mcekfgkf roke. Mkgckf portkik, acdoeks`kf momorkpk scimle-scimle akrc tolrc hcipufkf ykfg k`kf skfgkt morgufk fkftcfyk. Aojcfcsc 4 Hcipufkf acaojcfcsc`kf somkgkc ùipuekf lmdo`-lmdo`. Lmdo` akrc suktu hcipufkf acsomut kfggltk/oeoiof akrc hcipufkf torsomut. Aojcfcsc 4 Dc`k x kfggltk hcipufkf X, actuecs x ∈ X. Dc`k x mu`kf kfggltk hcipufkf X, actuecs actuecs x ∃ X

Hcipufkf X  sonkrk sonkrk eofg`kp actoftu`kf morakskr`kf kfggltk-kfggltkfyk. Aojcfcsc 4 Dc`k auk hcipufkf X akf S ioicec`c ioicec`c scjkt x ∈ X dc`k akf hkfyk dc`k x ∈ S uftu` soiuk x, ik`k X 9 S Aojcfcsc 4 X acsomut hcipufkf mkgckf akrc akrc S, actuecs X

⊍ S, dc`k akf hkfyk dc`k uftu` sotckp x ∈ X ⇝ x ∈ S

Akrc scfc, doeks mkhwk sotckp hcipufkf X  iorupk`kf iorupk`kf hcipufkf mkgckf akrc X . Aojcfcsc 4 Auk hcipufkf X akf S ac`ktk`kf skik, ykctu X 9 S, dc`k akf hkfyk dc`k X

⊍ S akf S ⊍ X

@krofk hcipufkf actoftu`kf leoh oeoiof-oeoioffyk, skekh sktu nkrk ykfg sorcfg acekù`kf uftu` iofaojcsc`kf somukh hcipufkf kakekh aofgkf iofyktk`kf òkfggltkkffyk (oeoiof), somkgkcikfk acaojcfcsc`kf morcùt cfc4 Aojcfcsc 4 Dc`k K kakekh hcipufkf aofgkf kfggltk-kfgggltk-fyk x ∈ X ykfg ioicec`c scjkt R ik`k K akpkt actuecs4 K 9 {x ∈ X |R ( x )}

ôhcfggk x ∈ K ⇑ x ∈ X akf R ( x ) . @krofk suakh acdoeks`kf somoeuifyk, ik`k tor`kakfg X  suakh pofaojcfcsckf K mcsk actuecs4 (x   )} K 9 {x  4 4 R ( x Hcipufkf ykfg tcak` ioipufykc kfggltk acfkik`kf aofgkf hcipufkf `lslfg, akf acekimkfg`kf aofgkf Ø. Qolroik ;.; 4 Hcipufkf `lslfg iorupk`kf hcipufkf mkgckf akrc sotckp hcipufkf.

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

Mu`tc 4 Acòtkhuc Ø hcipufkf `lslfg. Icske`kf X  kakekh kakekh somkrkfg hcipufkf. K`kf acmu`tc`kf mkhwk Ø ⊍ X , ykctu4 x ∈ Ø ⇝ x ∈ X Rorfyktkkf ac ktks iorupk`kf porfyktkkf cipec`ksc aofgkf kftosoaoffyk morfcekc skekh, `krofk Ø tcak` ioipufykc kfggltk. Morakskr`kf tkmoe òmofkrkf uftu` porfyktkkf cipec`ksc, porfyktkkf cipec`ksc ac ktks soekeu morfcekc mofkr. Dkac, tormu`tc mkhwk Ø ⊍ X.

 Dc`k x , y , akf z  kakekh kakekh oeoiof-oeoiof X , acaojcfcsc`kf hcipufkf-hcipufkf somkgkc morcùt4 Hcipufkf {x } ykctu hcipufkf ykfg kfggltkfyk hkfyk x Hcipufkf {x , y } ykctu hcipufkf ykfg kfggltk-kfggltkfyk hkfyk x  akf akf y Hcipufkf {x , y , z } ykctu hcipufkf ykfg kfggltk-kfggltkfyk hkfyk x , y , akf z akf somkgkcfyk. Hcipufkf {x } acsomut aofgkf ufct sot ktku scfgeotlf ktks x . ^ktu hke ykfg somkc`fyk hktc-hktc kftkrk x akf {x }. }. ômkgkc nlftlh, `ctk ioipufykc x ∈ {x } totkpc tcak` mofkr x ∈ x . Akeki {x , y } tcak` acmorekùkf urutkf kftkrk x  ktku ktku y , ykctu {x , y } 9 { y , x }. }. Mogctu dugk aofgkf {x , y , z } 9 { x , z , y } 9 { y , x , z } 9 { y , z , x } akf somkgkcfyk. @krofk kekskf cfcekh `ctk iofyomut { x , y } somkgkc pkskfgkf tk` torurut (uflraoroa pkcr). ôioftkrk ctu, `ctk iofuecs`kf 5 x , y 6 somkgkc pkskfgkf morurut (lraoroa pkcr). Akeki pkskfgkf morurutkf 5 x , y 6, 6, x  iorupk`kf iorupk`kf oeoiof portkik akf y  oeoiof oeoiof òauk. Aojcfcsc 4 5x, y6 9 5k, m6 dc`k akf hkfyk dc`k x 9 k akf y 9 m

Akrc aojcfcsc ac ktks, acscipue`kf mkhwk 4 x ≢ y ⇝ 5x , y 6 ≢ 5 y , x 6. 6. Icske`kf X   akf S   kakekh auk hcipufkf. Acaojcfcsc`kf Ror`keckf @krtosckf ktku Ror`keckf Ekfgsufg (Nkrtosckf, lr Acront Rrlaunt), X × S somkgkc morcùt4 Aojcfcsc 4 X × S 9 {5x, y6 | x

∈ X akf y ∈ S }

Dc`k X   mcekfgkf roke, ik`k X × X   iorupk`kf hcipufkf pkskfgkf morurutkf-pkskfgkf morurutkf ktks mcekfgkf roke akf oùcvkeof aofgkf hcipufkf tctc`-tctc` pkak mcakfg. Qor`kakfg, `ctk sorcfg iofuecs X = uftu` X × X , X > uftu` X × X × X , akf somkgkcfyk. Ektchkf 4 Qufdu``kf mkhwk {x  | | x ≢ x } 9 Ø Mu`tc 4 Icske K 9 {x  | | x ≢ x }. }. K`kf acmu`tc`kf mkhwk K 9 Ø. Kfakc`kf K ≢ Ø, ik`k kak x ∈ K. @krofk x ∈ K ik`k x ≢ x . Qcimue `lftrkac`sc. Dkac, pofgkfakckf skekh, ykfg mofkr K 9 Ø.

 ;.=.

Jufgsc Icske`kf X   akf S   kakekh auk hcipufkf. Jufgsc j   akrc (ktku pkak) X   ò (ktku òpkak) S ackrtc`kf somkgkc kturkf ykfg iofgkct`kf sotckp x ac X  aofgkf aofgkf topkt sktu kfggltk y ac S  sohcfggk sohcfggk y 9 ( x j ( x ). Grkjc` jufgsc j , actuecs G, kakekh ùipuekf pkskfgkf akeki moftu` 5 x , j ( (x   )6 x ac akeki X × S . Dkac, G ⊍ X × S  acsomut acsomut grkjc` akrc somukh jufgsc j   pkak X   dc`k akf hkfyk dc`k uftu` sotckp x ∈ X torakpkt aofgkf tufggke pkskfgkf akeki G ykfg oeoiof portkikfyk kakekh x  ktku ktku actuecs4 =

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

9 j ( ( x G 9 {5x , y 6 | y  9 x )} ⊍ X × S Qorechkt, jufgsc akpkt acaojcfcsc`kf ioekeuc grkjc`fyk `krofk jufgsc akpkt actoftu`kf aofgkf grkjc`fyk. Leoh `krofk ctu, acaojcfcsc`kf jufgsc akrc X ò S  kakekh kakekh hcipufkf j  akeki akeki X × S  acikfk acikfk sotckp x ∈ X ioipufykc topkt sktu y ∈ S  sohcfggk sohcfggk 5x , y 6 ∈ j . Aofgkf `ktk ekcf, Dc`k 5x , y 6 ∈ j  akf akf 5x , y– 6 ∈ j  ik`k ik`k y  9 9 y – @ktk ‘poiotkkf– sorcfg `kec acgufk`kf somkgkc scflfci uftu` `ktk ‘jufgsc–. Jufgsc j  akrc akrc X  ò ò S acekimkfg`kf aofgkf4 j  4 4 X ↝ S mcekikfk 5x , y 6 ∈ j  aofgkf aofgkf j  jufgsc, jufgsc, ik`k jufgsc akpkt actuecs y  9 9 j ( (x   ) ktku x  y . x Hcipufkf X  acsomut acsomut alikcf (ktku akorkh aojcfcsc) akrc j . Hcipufkf fcekc j , kakekh ( j ) 9 { y ∈ S  | | y  9 9 j ( (x   ), ] ( x x ∈ X } acsomut rkfgo akrc j . ]kfgo akrc jufgsc j  sonkrk sonkrk uiui k`kf eomch ònce akrc S , ktku ] ( ( j ) ⊍ S . Dc`k ] ( ( j ) 9 òpkak S ), ktku j  surdo`tcj. surdo`tcj. S , ik`k j acsomut jufgsc lftl (jufgsc j  òpkak Aojcfcsc 4 Acmorc`kf jufgsc j 4 X ↝  S, S, j surdo`tcj dc`k akf hkfyk dc`k uftu` sotckp y ∈  S S torakpkt x ∈  X X sohcfggk y 9 j(x). K`cmktfyk, dc`k j surdo`tcj, surdo`tcj, ik`k ](j) 9 S.

Dc`k K ⊍ X , acaojcfcsc`kf potk  (cikgo) (cikgo) akrc K torhkakp j  iorupk`kf iorupk`kf hcipufkf oeoiof-oeoiof ac akeki S  sohcfggk sohcfggk y  9 9 j ( (x   ) uftu` soiuk x  ac ac K, actuecs4 x ( K ) 9 { y ∈ S  | | y  9 9 j ( ( x j ( x ), x ∈ K} sohcfggk rkfgo akrc j  kakekh kakekh j ( ( X ), akf j  surdo`tcj surdo`tcj dc`k akf hkfyk dc`k S  9 9 j ( ( X ). Dc`k M ⊍ S , acaojcfcsc`kf prkpotk  (cfvors (cfvors cikgo) akrc M torhkakp j  iorupk`kf iorupk`kf hcipufkf oeoiofoeoiof ac akeki x  sohcfggk sohcfggk y  9 9 j ( (x   ) ∈ M, actuecs4 x | y  9 9 j ( (x   ), j  „;( M ) 9 {x ∈ X  | x y ∈ M}. Qolroik 4 Jufgsc j 4 X ↝  S S surdo`tcj ⇑  j j  „;(M) ≢Ø, ∂M ⊍ S akf M ≢ Ø ( j   surdo`tcj dc`k akf hkfyk dc`k prkpotk akrc hcipufkf mkgckf tk` `lslfg akrc S   iorupk`kf hcipufkf tk` `lslfg). Mu`tc 4 ( ⇝ ) Acòtkhuc j  surdo`tcj, surdo`tcj, sohcfggk S  9 9 j ( ( X ). K`kf acmu`tc`kf mkhwk ∂M ⊍ S akf M ≢ Ø, j  „;(M) ≢Ø @krofk M ≢ Ø ik`k torakpkt y ∈ M. @krofk y ∈ M akf M ⊍ S  ik`k ik`k y ∈ S . @krofk y ∈ S  akf akf S  9 9 j ( ( X ) ik`k y ∈ j ( ( X ). @krofk y ∈ j ( ( X ) ik`k torakpkt x ∈ X  sohcfggk sohcfggk y  9 9 j ( ( x x ) „; @krofk y  9 9 j ( ( x x ) akf y ∈ M, ik`k x ∈ j ( M ) uftu` suktu x ∈ X. „; Dkac, j (M) ≢Ø. ( ⇒ ) Acòtkhuc, ∂M ⊍ S akf M ≢ Ø, j  „;(M) ≢Ø K`kf acmu`tc`kf acmu`tc`kf mkhwk j  surdo`tcj, surdo`tcj, oùcvkeof aofgkf ioimu`tc`kf S  9 9 j ( ( X ) (c) K`kf acmu`tc`kf acmu`tc`kf mkhwk S ⊍ j ( ( X ) „; @krofk j ( M ) ≢ Ø, ik`k torakpkt x ∈ j  „;( M ) sohcfggk y 9 j ( (x   ) uftu` suktu y ∈ M. x @krofk M ⊍ S , ik`k y ∈ S . @krofk y  9 9 j ( ( x ( X ). x ) ik`k y ∈ j ( >

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

(cc) K`kf acmu`tc`kf acmu`tc`kf mkhwk j ( ( X ) ⊍ S „; @krofk j ( M ) ≢ Ø, ik`k torakpkt x ∈ j  „;( M ) sohcfggk y  9 9 j ( (x   ) uftu` suktu y ∈ M. x @krofk y  9 9 j ( ( x ( X ). x ) ik`k y ∈ j ( @krofk M ⊍ S , ik`k y ∈ S . Zorsc Rk Dkhkruaacf4 Icske y ∈ S . K`kf acmu`tc`kf y ∈ j ( ( X ). Kfakc`kf y ∃ j ( ( X ), ik`k tcak` kak x ∈ X  sohcfggk sohcfggk y  9 9 j ( (x   ). sohcfggk x Dkac, tcak` kak y ∈ S  sohcfggk 9 j ( (x   ). 9 j ( ( x somkrkfg, ik`k y  9 x @krofk M ⊍ S , ik`k tcak` kak y ∈ M sohcfggk y  9 x ). @krofk y  somkrkfg, „; ( X ). j ( M ) 9 Ø. @lftrkac`sc aofgkf hcpltoscs, dkac hkrusekh y ∈ j ( ( Qho Qho jleelwcfg prllj cs icfo  ) Icske y ∈ j ( ( X ). K`kf acmu`tc`kf y ∈ S @krofk y ∈ j ( ( X ) ik`k y  9 9 j ( ( x x ) uftu` suktu x ∈ X . @krofk j  „;( M ) ≢Ø akf y  9 9 j ( (x   ) uftu` suktu x ∈ X , ik`k x ∈ j  „;( M ) x @krofk x ∈ j  „;( M ) akf y  9 9 j ( (x   ), x ik`k y ∈ M @krofk y ∈ M akf M ⊍ S , ik`k y ∈ S .

 Aojcfcsc 4 Jufgsc j 4 X ↝  S S acsomut sktu-sktu (cfdo`tcj), dc`k ioiofuhc4 j(x ; ) 9 j(x =  ) ⇝ x ; 9 x = _ftu` sotckp x ; , x = ∈ X. Aojcfcsc 4 Jufgsc ykfg sktu-sktu akrc X òpkak S (cfdo`tcj akf surdo`tcj) acsomut `lrosplfaofsc sktu-sktu kftkrk X akf S (mcdo`tcj).

Mcek j  mcdo`tcj, mcdo`tcj, ik`k torakpkt jufgsc g  4 4 S ↝ X  sohcfggk sohcfggk uftu` sotckp x  akf akf y  morekù morekù g ( ( j  ( (x   )) x 9 x „; akf j ( ( g ( ( y   )) 9 y . Jufgsc g  acsomut acsomut cfvors akrc j  akf akf actuecs j . Icske`kf j  4 4 X ↝ S  akf akf g  4 4 S ↝ T , acaojcfcsc`kf jufgsc h  4 4 X ↝ T , ykctu h ( (x   ) 9 g ( ( j  ( (x   )). x x Jufgsc h acsomut `liplscsc akrc g  aofgkf aofgkf j  akf akf actuecs g  j . Dc`k j 4 X ↝ S  akf akf K ⊍ X acaojcfcsc`kf jufgsc g 4 K ↝ S  aofgkf aofgkf ruius g ( ( x (x   ), x ) 9 j ( x x ∈ K. Jufgsc g  acsomut acsomut mktkskf ( rostrcntclf ) j  torhkakp torhkakp K akf actuecs j | K. Jufgsc j  akf akf g  ioicec`c ioicec`c akorkh hksce rostrcntclf (rkfgo) akf prkpotk ykfg mormoak. Mkrcskf hcfggk ( f -tupeo) kakekh suktu jufgsc acikfk alikcffyk iorupk`kf f   mcekfgkf ksec f -tupeo) portkik, ykctu hcipufkf {c ∈ F  | | c ≡ f }. }. Mkrcskf tk`-hcfggk kakekh jufgsc acikfk alikcffyk iorupk`kf mcekfgkf ksec. @ctk iofggufk`kf cstcekh ―mkrcskf’ uftu` ioikhkic mkrcskf morhcfggk ktku tk`-morhcfggk. Dc`k akorkh hksce akrc mkrcskf cfc morkak akeki hcipufkf X , `ctk somut mkrcskf akrc ktku ac akeki X   ktku mkrcskf aofgkf oeoiof-oeoiof akrc X . Fcekc jufgsc pkak c , actuecs x c  akf iofyomut fcekc torsomut aofgkf oeoiof ò-c  akrc akrc mkrcskffyk. @ctk dugk iofggufk`mkf fltksc x c akf mkrcskf tk`-hcfggk aofgkf

x c

∖ . c 9;

f c 9;

uftu` iofuecs`kf f-tupeo torurut,

Fkiuf, tor`kakfg `ctk dugk iofyktk`kf mkrcskf sonkrk

soaorhkfk aofgkf x c . Akorkh hksce akrc mkrcskf x c k`kf acfltksc`kf aofgkf { x c }. ôhcfggk, akorkh f

f

hksce akrc f-tupeo torurut x c c 9; iorupk`kf hcipufkf tk`-torurut f-tupeo {x c }c 9; . Hcipufkf K ac`ktk`kf torhctufg ( nluftkmeo ) dc`k K skik aofgkf akorkh hksce suktu mkrcskf nluftkmeo (hcfggk ktku tk`-hcfggk). Qotkpc mcekikfk K skik aofgkf akorkh hksce akrc mkrcskf hcfggk, ik`k K acsomut hcipufkf hcfggk (  jcfcto ). Hcipufkf ykfg mu`kf mu`kf hcipufkf hcfggk hcfggk acsomut hcipufkf tk`-hcfggk tk`-hcfggk ( cfjcfcto ). cfjcfcto ^kekh sktu nkrk uftu` iofakpkt`kf mkrcskf tk`-hcfggk (cfjcfcto soquofno) kakekh somkgkc 1

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

morcùt4 Rrcfscp ]oùrscj 4

Icske`kf j  4 4 X ↝ X  akf akf k ∈ X , ik`k torakpkt sktu (tufggke) mkrcskf tk`-hcfggk x c sohcfggk (x )c   uftu` sotckp c x ; 9 k , akf x c  + x + ; 9 j (

∖ akrc X c 9;

_ftu` sotckp mcekfgkf ksec f , icske`kf j f 4 X f ↝ X  akf akf k ∈ X . Ik`k torakpkt mkrcskf tufggke (ufcqo) x c akrc X  sohcfggk sohcfggk x ; 9 k  akf akf x c  + x; ,…,x  ). c + ; 9 j c ( x Jufgsc g 4 F ↝ F  ac`ktk`kf ac`ktk`kf ilfltlf, dc`k g ( ( ) c c 6 g ( ( d ) uftu` c 6 d . Jufgsc h  ac`ktk`kf ac`ktk`kf mkrcskf mkgckf tk`-hcfggk akrc j , dc`k torakpkt poiotkkf ilfltlf g  4 4 F ↝ F  sohcfggk sohcfggk h  9 9 j  g . Dc`k j 9 5j c 6 akf g  9 9 5 g c 6, ik`k j  g  actuecs actuecs 5 j  gc 6. ;.>.

Gkmufgkf, Crcskf, akf @lipeoiof Acmorc`kf hcipufkf X  akf akf ℘( ) hcipufkf sumsot akrc X . Icske`kf K akf M sumsot akrc X , X acaojcfcsc`kf lporksc crcskf, gkmufgkf, akf `lipeoiof somkgkc morcùt4 Aojcfcsc 4 Crcskf hcipufkf K aofgkf M, actuecs K ∣ M, acaojcfcsc`kf somkgkc4 K ∣ M 9 {x ∈ X | x ∈ K akf x ∈ M} Gkmufgkf hcipufkf K aofgkf M, actuecs K ∤ M, acaojcfcsc`kf somkgkc4 K ∤ M 9 {x ∈ X | x ∈ K ktku x ∈ M} @lipeoiof hcipufkf K, actuecs „K ktku K ,n acaojcfcsc`kf somkgkc4 „K 9 Kn  9 {x ∈ X |x ∃ K}

Akrc, aojcfcsc-aojcfcsc ac ktks, acturuf`kf scjkt-scjkt lporksc pkak hcipufkf akeki tolroik morcùt4 Qolroik 4 Acmorc`kf hcipufkf X  akf akf K akf M kakekh sumsot akrc X . Ik`k morekù4 ;. K ∣ M 9 M ∣ K =. K ∤ M 9 M ∤ K >. K ∣ M ⊍ K 1. K ⊍ K ∤ M ?. K ∣ M 9 K ⇑ K ⊍ M :. K ∤ M 9 K ⇑ M ⊍ K 7. ( 9 K ∣ ( M ∣ N ) 9 K ∣ M ∣ N K ∣ M ) ∣ N  9 8. ( 9 K ∤ ( M ∤ N ) 9 K ∤ M ∤ N K ∤ M ) ∤ N  9 3. K ∣ ( M ∤ N ) 9 ( ) K ∣ M ) ∤ ( K ∣ N ;2. K ∤ ( M ∣ N ) 9 ( ) K ∤ M ) ∣ ( K ∤ N Mu`tc 4 ;. x ∈ K ∣ M ⇑ x ∈ K akf x ∈ M ⇑ x ∈ M akf x ∈ K ⇑ M ∣ K =. x ∈ K ∤ M ⇑ x ∈ K ktku x ∈ M ⇑ x ∈ M ktku x ∈ K ⇑ M ∤ K >. x ∈ K ∣ M ⇑ x ∈ K akf x ∈ M ?

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

⇝ x ∈ K Dkac K ∣ M ⊍ K 1. x ∈ K ⇝ x ∈ K ktku x ∈ M Dkac K ⊍ K ∤ M ?. K ∣ M 9 K ⇑ K ⊍ M (c) Acòtkhuc K ∣ M 9 K, k`kf acmu`tc`kf mkhwk K ⊍ M Ackimce somkrkfg x ∈ K. @krofk K ∣ M 9 K akf x ∈ K, ik`k x ∈ K ∣ M @krofk x ∈ K ∣ M, ik`k x ∈ K akf x ∈ M. Dkac, tormu`tc mkhwk uftu` sotckp x ∈ K ik`k x ∈ M. (cc) Acòtkhuc K ⊍ M, k`kf acmu`tc`kf mkhwk K ∣ M 9 K Rortkik, acmu`tc`kf K ∣ M ⊍ K. Aofgkf iofggufk`kf (>) tormu`tc. @oauk, acmu`tc`kf K ⊍ K ∣ M. Ackimce somkrkfg x ∈ K. @krofk K ⊍ M, ik`k x ∈ M. Dkac, x ∈ K akf x ∈ M, ktku x ∈ K ∣ M Dkac, tormu`tc mkhwk mkhwk K ∣ M 9 K. :. K ∤ M 9 K ⇑ M ⊍ K (c) Acòtkhuc K ∤ M 9 K, k`kf acmu`tc`kf mkhwk M ⊍ K Ackimce somkrkfg x ∈ M. Kfakc`kf x ∃ K, ik`k x ∃ K ∤ M. @krofk x ∃ K ∤ M ik`k x ∃ K akf x ∃ M. @lftrkac`sc aofgkf acòtkhuc x ∈ M. Dkac pofgkfakckf skekh, ykfg mofkr x ∈ K. (cc) Acòtkhuc M ⊍ K, k`kf acmu`tc`kf mkhwk K ∤ M 9 K Rortkik, acmu`tc`kf K ∤ M ⊍ K Ackimce somkrkfg x ∈ K ∤ M, ik`k x ∈ K ktku x ∈ M. @krofk M ⊍ K akf x ∈ M, ik`k x ∈ K. Dkac, uftu` sotckp x ∈ K ∤ M ik`k x ∈ K. @oauk, acmu`tc`kf K ⊍ K ∤ M. Aofgkf iofggufk`kf (1) tormu`tc. Dkac tormu`tc K ∤ M 9 K K ∣ M ) ∣ N ⇑ x ∈ ( K ∣ M ) akf x ∈ N 7. x ∈ ( ⇑ x ∈ K akf x ∈ M akf x ∈ N ⇑ x ∈ (  K ∣ M ∣ N  ) ) x ∈ M akf x ∈ N ⇑ x ∈ K akf ( x ⇑ x ∈ K akf x ∈ ( M ∣ N  ) ⇑ x ∈ K ∣ ( M ∣ N  ) 8. x ∈ ( K ∤ M ) ∤ N ⇑ x ∈ ( K ∤ M ) ktku x ∈ N ⇑ x ∈ K ktku x ∈ M ktku x ∈ N ⇑ x ∈ (  K ∤ M ∤ N  ) ) x ∈ M ktku x ∈ N ⇑ x ∈ K ktku ( x ⇑ x ∈ K ktku x ∈ ( M ∤ N  ) ⇑ x ∈ K ∤ ( M ∤ N  ) 3. x ∈ K ∣ ( M ∤ N ) ⇑ x ∈ K akf x ∈ ( M ∤ N ) x ∈ M ktku x ∈ N) ⇑ x ∈ K akf ( x ) x ∈ K akf x ∈ M ) ktku ( x x ∈ K akf x ∈ N ⇑ ( x ⇑ x ∈ (  K ∣ M ) ktku x ∈ (  K ∣ N  ) ⇑ x ∈ (  K ∣ M ) ∤ (  K ∣ N  ) ;2. x ∈ K ∤ ( M ∣ N ) ⇑ x ∈ K ktku x ∈ ( M ∣ N ) ) x ∈ M akf x ∈ N ⇑ x ∈ K ktku ( x :

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

) x ∈ K ktku x ∈ M ) akf ( x x ∈ K ktku x ∈ N ⇑ ( x ⇑ x ∈ (  K ∤ M ) akf x ∈ (  K ∤ N  ) ⇑ x ∈ (  K ∤ M ) ∣ (  K ∤ N  )

 Hcipufkf `lslfg Ø ioikcf`kf porkfkf ykfg poftcfg ac akeki rukfg X , akf acsomut`kf ioekeuc scjkt morcùt4 Qolroik 4 Dc`k Ø hcipufkf `lslfg, X  somkrkfg somkrkfg hcipufkf akf K ⊍ X , ik`k morekù4 ;. K ∤ Ø 9 K =. K ∣ Ø 9 Ø >. K ∤ X  9 9 X 1. K ∣ X  9 9 K Mu`tc 4 ;. Ackimce somkrkfg x ∈ K ∤ Ø, ik`k x ∈ K ktku x ∈ Ø. @krofk x ∈ Ø skekh, ik`k hkrusekh x ∈ K. ômkec`fyk, ackimce somkrkfg x ∈ K. Ik`k x ∈ K ktku x ∈ Ø. Dkac, x ∈ K ∤ Ø =. Kfakc`kf K ∣ Ø ≢ Ø ik`k torakpkt x ∈ K ∣ Ø. @krofk x ∈ K ∣ Ø ik`k x ∈ K akf x ∈ Ø. Akrc scfc tcimue `lftrkac`sc, `krofk x ∈ Ø skekh. Dkac, pofgkfakckf skekh, ykfg mofkr kakekh K ∤ Ø 9 Ø. >. Ackimce somkrkfg x ∈ K ∤ X , ik`k x ∈ K ktku x ∈ X . Dkac, x ∈ X . ômkec`fyk, ackimce somkrkfg x ∈ X . Ik`k x ∈ K ktku x ∈ X . Dkac, x ∈ K ∤ X . 1. Ackimce somkrkfg x ∈ K ∣ X , ik`k x ∈ K akf x ∈ X . Dkac, x ∈ K. ômkec`fyk, ackimce somkrkfg x ∈ K. @krofk K ⊍ X   akf x ∈ K, ik`k x ∈ X . Dkac, x ∈ K ∣ X .

 Akrc aojcfcsc `lipeoiof K, acporleoh tolroik somkgkc morcùt4 Qolroik 4 Dc`k Ø hcipufkf `lslfg, X  somkrkfg somkrkfg hcipufkf akf K ⊍ X , ik`k morekù4 n ;. Ø 9 X =. X n 9 Ø >. ( K )n n  9 K 1. K ∤ Kn  9 X ?. K ∣ Kn  9 Ø :. K ⊍ M ⇑ Mn ⊍ Kn Mu`tc 4 ;. @krofk Ø 9 {x ∈ X  | | x ∃ X }, }, ik`k Øn  9 {x ∈ X  | | x ∈ X } 9 X n =. @krofk X  9 9 {x ∈ X  | | x ∈ X }, }, ik`k X  9 {x ∈ X  | | x ∃ X } 9 Ø >. @krofk Kn  9 {x ∈ X  | | x ∃ K}, ik`k ( | x ∈ K} 9 K K )n n  9 {x ∈ X  | n 1. Ackimce somkrkfg x ∈ K ∤ K , ik`k x ∈ K ktku x ∈ Kn . @krofk K ⊍ X   ik`k x ∈ X . ômkec`fyk, ackimce somkrkfg x ∈ X . @krofk K ⊍ X , ik`k x ∈ K ktku x ∃ K. Dkac, x ∈ K ktku x ∈ Kn . Ik`k, x ∈ K ∤ Kn . ?. Kfakc`kf K ∣ Kn ≢ Ø, ik`k torakpkt x ∈ K ∣ Kn . @krofk x ∈ K ∣ Kn  ik`k x ∈ K akf x ∈ Kn . K`cmktfyk, x ∈ K akf x ∃ K. Qordkac `lftrkac`sc. Dkac, pofgkfakckf skekh, ykfg mofkr K ∣ Kn  9 Ø. :. K ⊍ M ⇑ Mn ⊍ Kn (c) Acòtkhuc K ⊍ M, k`kf acmu`tc`kf mkhwk Mn ⊍ Kn . Ackimce somkrkfg x ∈ Mn . @krofk x ∈ Mn , ik`k x ∃ M. @krofk K ⊍ M, ik`k x ∃ K. Dkac, x ∈ Kn . 7

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

(cc) Acòtkhuc Mn ⊍ Kn , k`kf acmu`tc`kf mkhwk K ⊍ M Ackimce somkrkfg x ∈ K. @krofk x ∈ K, ik`k x ∃ Kn . @krofk Mn ⊍ Kn , ik`k x ∃ Mn . @krofk x ∃ Mn , ik`k x ∈ M.

 Auk huùi ykfg iofgkct`kf `lipeoiof suktu hcipufkf aofgkf gkmufgkf akf crcskffyk acmorc`kf akeki Huùi Ao Ilrgkf somkgkc morcùt4 Qolroik (Huùi Ao Ilrgkf) Ilrgkf) 4 Dc`k X  somkrkfg somkrkfg hcipufkf akf K akf M hcipufkf mkgckf akrc X , ik`k morekù4 ;. ( K ∤ M )n  9 Kn ∣ Mn =. ( K ∣ M )n  9 Kn ∤ Mn Mu`tc 4 ;. x ∈ ( K ∤ M )n ⇑ x ∃ ( K ∤ M ) ⇑ x ∃ K akf x ∃ M ⇑ x ∈ Kn  akf x ∈ Mn ⇑ x ∈ (  Kn ∣ M )n =. x ∈ ( K ∣ M )n ⇑ x ∃ ( K ∣ M ) ⇑ x ∃ K ktku x ∃ M ⇑ x ∈ Kn  ktku x ∈ Mn ⇑ x ∈ (  Kn ∤ M )n

 Dc`k K akf M iorupk`kf hcipufkf mkgckf akrc X , acaojcfcsc`kf moak ( acjjorofno ) K akf M, actuecs acjjorofno M ~ K ktku `lipeoiof roektcj akrc K ac M somkgkc hcipufkf ykfg oeoiof-oeoioffyk ac K totkpc tcak` ac M. Dkac, M ~ K 9 {x ∈ X | x ∈ K akf x ∃ M} Akrc scfc torechkt mkhwk, M ~ K 9 K ∣ Mn . Moak sciotrc ( syiiotrcn hcipufkf K akf M acaojcfcsc`kf somkgkc4 syiiotrcn acjjorofno  ) akrc auk hcipufkf K ∊ M 9 ( K ~ M ) ∤ ( M ~ K ) Moak sciotrc akrc auk hcipufkf morcsc soiuk oeoiof ykfg iofdkac kfggltk akrc hcipufkf ykfg sktu ktku ykfg ekcffyk totkpc mu`kf kfggltk òaukfyk. Dc`k crcskf akrc òauk hcipufkf kakekh `lslfg, ac`ktk`kf òauk hcipufkf torsomut skecfg eopks ktku acsdlcft. @leo`sc hcipufkf-hcipufkf, ύ ac`ktk`kf `leo`sc acsdlcft ktks hcipufkf-hcipufkf dc`k sotckp auk hcipufkf ac ύ kakekh acsdlcft. Rrlsos iofgkimce crcskf ktku gkmufgkf akrc auk hcipufkf akpkt acporeuks aofgkf ioekù`kf poruekfgkf uftu` ioimorc`kf crcskf ktku gkmufgkf akrc somkrkfg `leo`sc morhcfggk ktks hcipufkf. @ctk mcsk ioimorc`kf aojcfcsc akrc crcskf uftu` somkrkfg `leo`sc ύ ktks hcipufkf-hcipufkf. hcipufkf-hcipufkf. Crcskf akrc `leo`sc ύ kakekh hcipufkf ykfg oeoiof-oeoiof akrc X  iorupk`kf iorupk`kf kfggltk uftu` sotckp kfggltk akrc ύ. @ctk iofuecs`kf crcskf cfc aofgkf ∣ K ktku ∣{ K | K ∈ ύ } . Dkac, K∈ύ

∣ K 9 ∣{ K| K ∈ ύ } 9 {x ∈ X | x ∈ K,

uftu` sotckp K ∈ ύ }

K∈ύ

ônkrk skik, aojcfcsc akrc gkmufgkf somkgkc morcùt4 ∤ K 9 ∤{ K| K ∈ ύ } 9 {x ∈ X | x ∈ K, uftu` suktu K ∈ ύ } K∈ύ

Qolroik (Huùi Ao Ilrgkf) Ilrgkf) 4 n

⎫ ⎡ ;. ⎭ ∣ K ⎯ 9 ∤ K n ⎮ K∈ύ ⎪ K∈ύ 8

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c n

⎫ ⎡ =. ⎭ ∤ K ⎯ 9 ∣ K n ⎮ K∈ύ ⎪ K∈ύ Mu`tc 4 n

⎫ ⎡ ;. Ackimce somkrkfg x ∈ ⎭ ∣ K ⎯ ⎮ K∈ύ ⎪ n ⎫ ⎡ x ∈ ⎭ ∣ K⎯ . ⇑ x ∃ ∣ K K∈ύ ⎮ K∈ύ ⎪ . ⇑ x ∃ K , uftu` uftu` suktu K ∈ ύ . ⇑ x ∈ K n , uftu` uftu` sukt suktu K ∈ ύ . ⇑ x ∈ ∤ K n K∈ύ n

⎫ ⎡ =. Ackimce somkrkfg x ∈ ⎭ ∤ K ⎯ ⎮ K∈ύ ⎪ n ⎫ ⎡ x ∈ ⎭ ∤ K⎯ . ⇑ x ∃ ∤ K K∈ύ ⎮ K∈ύ ⎪ . ⇑ x ∃ K , ∂K ∈ ύ . ⇑ x ∈ K n , ∂K ∈ ύ . ⇑ x ∈ ∣ K n K∈ύ

 Qolroik (Huùi Acstrcmutcj) 4

⎫

⎡

;. M ∣ ⎭ ∤ K ⎯ 9

∤ ( M ∣ K)

⎮ K∈ύ ⎪ K∈ύ ⎫ ⎡ =. M ∤ ⎭ ∣ K ⎯ 9 ∣ ( M ∤ K ) ⎮ K∈ύ ⎪ K∈ύ Mu`tc 4

⎫

⎡

;. Ackimce somkrkfg x ∈ M ∣ ⎭ ∤ K ⎯ , acporleoh4

⎮ K∈ύ ⎪

⎫

⎡

x ∈ M ∣ ⎭ ∤ K ⎯ . ⇑ x ∈ M akf x ∈ ∤ K

⎮ K∈ύ ⎪

K∈ύ

. ⇑ x ∈ M akf x ∈ K uftu` suktu K ∈ ύ . ⇑ x ∈ ( M ∣ K ) uftu` suktu K ∈ ύ . ⇑ x ∈ ∤ (M ∣ K) K∈ύ

⎫

⎡

=. Ackimce somkrkfg x ∈ M ∤ ⎭ ∣ K ⎯ , acporleoh4

⎮ K∈ύ ⎪

3

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

⎫

⎡

x ∈ M ∤ ⎭ ∣ K ⎯ . ⇑ x ∈ M ktku x ∈ ∣ K

⎮ K∈ύ ⎪

K∈ύ

. ⇑ x ∈ M ktku x ∈ K uftu` sotckp K ∈ ύ . ⇑ x ∈ ( M ∤ K ) uftu` sotckp K ∈ ύ . ⇑ x ∈ ∣ (M ∤ K) K∈ύ

 Mkrcskf pkak hcipufkf mkgckf akrc X  `ctk `ctk krtc`kf mkrcskf akrc ℘( ), ykctu somukh poiotkkf X akrc F ò ℘( ). Dc`k 5 Kc 6 kakekh somukh mkrcskf tk`-hcfggk pkak hcipufkf mkgckf akrc X , `ctk X ∖

iofltksc`kf

∤ Kc uftu` gkmufgkf akrc akorkh hksce (rkfgo) mkrcskffyk. ôhcfggk, c 9;

∖

∤ Kc 9 {x ∈ X | x ∈ Kc ,

uftu` suktu c } 0 akf

c 9;

∖

∣ Kc 9 {x ∈ X |x ∈ Kc ,

uftu` sotckp c }

c 9;

ônkrk skik, dc`k

Mc

f c 9;

iorupk`kf mkrcskf hcfggk pkak hcipufkf mkgckf akrc X , `ctk

f

iofuecs`kf

∣ Mc somkgkc crcskf akrc akorkh hksce mkrcskffyk, leoh `krofk ctu4 c 9; f

∣ Mc 9 M; ∣ M= ∣  ∣ Mf c 9;

Hcipufkf mkgckf akrc X  ykfg ykfg morcfaox kakekh suktu jufgsc pkak hcipufkf cfao`s ΐ ò X  ktku ktku ò hcipufkf mkgckffyk. Dc`k ΐ hcipufkf mcekfgkf ksec, ik`k fltksc hcipufkf morcfao`s skik aofgkf fltksc mcekfgkf ksec. Mckskfyk iofggufk`kf fltksc x ΰ akrc pkak x ( (ΰ ) akf iofuecs`kf cfao`s-fyk aofgkf {x ΰ} ktku {x ΰ 4 ΰ ∈ΐ}. Morcùt cfc aojcfcsc crcskf akf gkmufgkf akrc hcipufkf morcfao`s4 ∣ Kΰ 9 {x ∈ X |x ∈ Kΰ , uftu` sotckp ΰ ∈ ΐ} ΰ ∈ΐ

∤ Kΰ 9 {x ∈ X | x ∈ Kΰ ,

uftu` suktu ΰ ∈ ΐ}

ΰ ∈ΐ

Mcekikfk ΐ 9 F  ik`k ik`k acporleoh

∖

∣ Kc 9 ∣ Kc (sorupk dugk uftu` gkmufgkf) c ∈F

c 9;

Dc`k j  ioiotk`kf ioiotk`kf X  òpkak òpkak S  akf akf { Kΰ} `leo`sc hcipufkf mkgckf akrc X , ik`k4

⎫ ⎮ΰ

⎡ ⎪

⎫ ⎮ΰ

⎡ ⎪

j ⎭∤ Kΰ ⎯ 9 ∤ j P Kΰ Y akf j ⎭∣ Kΰ ⎯ ⊍ ∣ j ( Kΰ ) ΰ

ΰ

Mu`tc 4 Zorsc Rk Dkhkruaacf4

⎫ ⎡ 9 j ( (x   ). x ∈ j ⎭∤ Kΰ ⎯ , ik`k torakpkt x ∈ ∤ Kΰ sohcfggk y  9 ΰ ⎮ ΰ ⎪ @krofk x ∈ ∤ Kΰ , ik`k x ∈ Kΰ uftu` suktu ΰ ∈ ΐ. @krofk x ∈ Kΰ sohcfggk y 9 j ( ( x x ),

(c) Ackimce somkrkfg

ΰ

ik`k y ∈ j ( Kΰ ) uftu` suktu ΰ. Dkac,

∈ ∤ j P Kΰ Y ΰ

(cc) Eojt ks kf oxorncso! Iy Zorsclf4

;2

Mkm ; „ Qolrc Hcipufkf

⎫ ⎮ ΰ

Nlipceoa my 4 @hkorlfc, ^.^c

⎡ ⎪

ftu` suktu ΰ y ∈ j ⎭∤ Kΰ ⎯ . ⇝ y 9 j ( x ), ∂x ∈ Kΰ uftu . ⇝ y ∈ j ( Kΰ ), uf u ftu` suktu ΰ . ⇝ y ∈ ∤ j ( Kΰ  ) ΰ

y ∈ ∤ j ( Kΰ ) ⇝ y ∈ j ( Kΰ ), uftu` suktu ΰ ΰ

⇝ y 9 j ( x ), ∂x ∈ Kΰ , uftu` suktu ΰ ⎫ ⎡ ⇝ y ∈ j ⎭∤ Kΰ ⎯ ⎮ ΰ ⎪ ⎫ ⎡ ôek ôekfd fdut utfy fyk, k, k`kf k`kf acmu acmu`t `tc` c`kf kf mkhw mkhwkk 4 j ⎭∣ Kΰ ⎯ ⊍ ∣ j ( Kΰ ) . ⎮ΰ ⎪ ΰ ⎫ ⎡ y ∈ j ⎭∣ Kΰ ⎯ . ⇝ y 9 j ( x ), ∂x ∈ Kΰ , ∂ΰ ⎮ ΰ ⎪ . ⇝ y ∈ j ( Kΰ  ), ∂ΰ . ⇝ y ∈ ∣ j ( Kΰ ) ΰ

 _ftu` prkpotk, icske`kf { Mΰ} `leo`sc hcipufkf mkgckf akrc S , ik`k j

∝;

⎫ ⎡ ⎡ ∝; ∝; ⎫ ∝; ⎭∤ Mΰ ⎯ 9 ∤ j ( Mΰ ) akf j ⎭∣ Mΰ ⎯ 9 ∣ j ( Mΰ ) ⎮ ΰ ⎪ ΰ ⎮ ΰ ⎪ ΰ

Mu`tc 4

⎫ ⎮ΰ

⎡ ⎪

K`kf acmu`tc`kf mkhwk j ∝; ⎭∤ Mΰ ⎯ 9 ∤ j ∝;( Mΰ ) .

⎫ ⎮ΰ

ΰ

⎡ ⎪

Rortkik, acmu`tc`kf mkhwk j ∝; ⎭∤ Mΰ ⎯ ⊍ ∤ j ∝; ( Mΰ ) x∈ j

∝;

ΰ

⎫ ⎡ M ∤ ΰ ⎭ ⎯ . ⇝ ∂x ∈ Mΰ , y 9 j ( x ), uf tu` suktu ΰ ⎮ ΰ ⎪ . ⇝ x ∈ j ∝; ( Mΰ ), uftu` suktu ΰ . ⇝ x ∈ ∤ j ∝;( Mΰ  ) ΰ

@oauk, acmu`tc`kf mkhwk

∝; ∤ j ( Mΰ ) ⊍ j ΰ

∝;

∝;

⎫ ⎡ M ⎭∤ ΰ ⎯ ⎮ ΰ ⎪

∝;

x ∈ ∤ j ( Mΰ ). ⇝ x ∈ j ( Mΰ ), uftu` suktu ΰ ΰ

. ⇝ ∂x ∈ M ΰ , y 9 j ( x ), uftu` suktu ΰ .⇝ x∈ j

∝;

⎫ ⎡ ⎭∤ Mΰ ⎯ ⎮ ΰ ⎪

ôekfdutfyk k`kf acmu`tc`kf mkhwk, j

∝;

⎫ ⎡ ∝; M ⎭∣ ΰ ⎯ 9 ∣ j ( Mΰ ) ⎮ ΰ ⎪ ΰ

;;

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

⎫ ⎮ΰ

⎡ ⎪

Rortkik, acmu`tc`kf mkhwk j ∝; ⎭∣ Mΰ ⎯ ⊍ ∣ j ∝; ( Mΰ ) x∈ j

∝;

ΰ

⎫ ⎡ M ⎭∣ ΰ ⎯ . ⇝ ∂x ∈ Mΰ , y 9 j ( x ), ∂ΰ ⎮ ΰ ⎪ . ⇝ x ∈ j ∝; ( Mΰ ), ∂ΰ . ⇝ x ∈ ∣ j ∝;( Mΰ  ) ΰ

@oauk, acmu`tc`kf mkhwk

∣ j

∝;

( Mΰ ) ⊍ j

∝;

ΰ

⎫ ⎡ M ∣ ΰ ⎭ ⎯ ⎮ ΰ ⎪

x ∈ ∣ j ∝;( Mΰ ). ⇝ x ∈ j ∝; ( Mΰ ), ∂ΰ ΰ

. ⇝ ∂x ∈ M ΰ , y 9 j ( x ), ∂ ΰ .⇝ x∈ j

∝;

⎫ ⎡ M ∣ ΰ ⎭ ⎯ ⎮ ΰ ⎪ 

;.1.

Kedkmkr Hcipufkf Hcipufkf @leo`sc hcipufkf M acsomut kedkmkr hcipufkf ktku kedkmkr Mlleokf, dc`k uftu` sotckp K, M ∈ M morekù K ∤ M ∈ M akf Kn ∈ M. Akeki, mcekfgkf roke, `leo`sc hcipufkf mkgckf K   akrc X   acsomut kedkmkr hcipufkf ktku kedkmkr Mlleokf dc`k ∂ K, M ∈ K  morekù4 morekù4 (c) K ∤ M ∈ K (cc) Kn ∈ K Akrc huùi Ao Ilrgkf , (ccc) ( K ∤ M )n ∈ K ⇑ K ∣ M ∈ K Qorechkt, dc`k `leo`sc hcipufkf hcipufkf mkgckf K  akrc akrc X  ioiofuhc ioiofuhc (ccc) akf (cc), ik`k aofgkf huùi Ao Ilrgkf   (c) dugk acpofuhc, sohcfggk iorupk`kf kedkmkr hcipufkf. Aofgkf iofgkimce gkmufgkf hcipufkf-hcipufkf, hcipufkf-hcipufkf, torechkt mkhwk4 K;, … , Kf hcipufkf-hcipufkf hcipufkf-hcipufkf ac K  ik`k ik`k K; ∤ K= ∤ … ∤ Kf dugk morkak ac K .

Nlftlh 4 Hcipufkf M 9 {{;}, {=, >, 1}, {;, =, >, 1},

∏} kakekh kedkmkr hcipufkf. 

Rrlplscsc 4 Icske`kf N `leo`sc hcipufkf mkgckf akrc X , ik`k torakpkt kedkmkr hcipufkf torònce K  ykfg ykfg ioiukt N0 ykctu, dc`k torakpkt kedkmkr hcipufkf K ykfg ioiukt N sohcfggk dc`k M somkrkfg kedkmkr ykfg ioiukt N ik`k M ioiukt K . Mu`tc 4 Icske`kf J `leo`sc hcipukf mkgckf akrc X   ykfg morupk kedkmkr hcipufkf ykfg ioiukt N. Acaojcfcsc`kf, ] 9 ∣M M∈J

@krofk ] ⊍ M ∂M ∈ J akf M kedkmkr hcipufkf ykfg ioiukt N ik`k ]   ioiukt N. ôekfdutfyk acmu`tc`kf ]  suktu suktu kedkmkr hcipufkf. Icske`kf K, M ∈ ]  ik`k ik`k K, M ∈ M, ∂M ∈ J. @krofk M kedkmkr hcipufkf, ik`k K ∤ M ∈ M, ,

;=

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

∂M ∈ J, akf Kn ∈ M, ∂M ∈ J. @krofk K ∤ M ∈ M akf Kn ∈ M, ∂M ∈ J ik`k K ∤ M ∈ ∣ M akf K n ∈ ∣ M M∈J

M∈J

@krofk K ∤ M ∈ ∣ M akf K n ∈ ∣ M ik`k M∈J

M∈J

K ∤ M ∈ ∣{ M|M ∈ J } 9 ] akf K n ∈ ∣{ M|M ∈ J } 9 ]

Dkac ]  kedkmkr kedkmkr hcipufkf.

 Kedkmkr torònce ykfg ioiukt N acsomut kedkmkr ykfg acmkfguf leoh N. Rrlplscsc 4 Icske`kf Kc kakekh mkrcskf hcipufkf pkak (ktku ac akeki) kedkmkr hcipufkf

] , ik`k

torakpkt mkrcskf hcipufkf Mc pkak ]  sohcfggk4 sohcfggk4 akf Mf ∣ Mi  9 ∏  , f ≢ i  akf

∖

∖

c 9;

c 9;

∤ Mc 9 ∤ Kc

Mu`tc 4 Icske`kf M; 9 K;, M= 9 K=, akf uftu` sotckp mcekfgkf ksec f  6 6 ;, acaojcfcsc`kf4 Mf 9 Kf ~ ( K; ∤ K= ∤ ... ∤ Kf ∝; )

9 Kf ∣ ( K; ∤ K= ∤ ... ∤ Kf ∝; ) 9 Kf ∣ K;n ∣ K=n ∣ ... ∣ Kf n ∝;

n

ômkgkc ceustrksc, porhktc`kf ackgrki morcùt4 K ;

K=

M=

M;

M> K>

Mf ⊍ Kf  akf Kc mkrcskf hcipufkf pkak kedkmkr hcipufkf ] , ik`k Mf ∈ ] ∂f . Dkac, mkrcskf

5 f , Mi ⊍ Ki . Dkac, Mc pkak ] . @krofk Mf ⊍ Kf ∂f , ik`k uftu` i  5 Mi ∣ Mf ⊍ Ki ∣ Mf

9 Ki ∣{ Kf ∣ K;n ∣ K=n ∣ ... ∣ Kin ... ∣ Kfn ∝;} 9 ( Ki ∣ Kin ) ∣ { Kf ∣ K;n ∣ K=n ∣ ... ∣ Kfn ∝;} 9 ∏ ∣{ Kf ∣ K;n ∣ K=n ∣ ... ∣ Kf n ∝;} 9∏ ôekfdutfyk, `krofk Mc ⊍ Kc ∂c , ik`k

∖

∖

∖

∖

c 9;

c 9;

c 9;

c 9;

∤ Mc ⊍ ∤ Kc . K`kf acmu`tc`kf ∤ Kc ⊍ ∤ Mc . Icske`kf

∖

fcekc torònce akrc { c  | | x ∈ Kc }, ik`k x ∈ Mf , uftu` x ∈ ∤ Kc , ik`k x ∈ Kc  uftu` suktu c . Dc`k f  fcekc c 9;

∖

suktu f . Dkac x ∈ ∤ Mc . c 9;

 Kedkmkr hcipufkf ]  ac`ktk`kf ac`ktk`kf kedkmkr- ώ ktku ekpkfgkf Mlroe, dc`k gkmufgkf akrc sotckp `leo`sc ;>

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

hcipufkf torhctufg ac ]  dugk dugk torakpkt ac ] . Skctu, dc`k Kc mkrcskf hcipufkf pkak kedkmkr ] , ik`k ∖

kedkmkr-ώ. Akrc huùi Ao Ilrgkf, acporleoh dugk mkhwk crcskf ∤ Kc dugk morkak ac ] . ôhcfggk ]  kedkmkrc 9;

akrc sotckp `leo`sc hcipufkf torhctufg ac ]  dugk dugk torakpkt ac ] . Aofgkf ioekù`kf soac`ct ilacjc`ksc pkak Rrlplscsc ac ktks (portkik), acporleoh prlplscsc somkgkc morcùt. Rrlplscsc 4 Icske`kf N `leo`sc hcipufkf mkgckf akrc X , ik`k torakpkt kedkmkr- ώ torònce ]  ykfg ykfg ioiukt N. Mu`tc 4 Icske`kf J `leo`sc hcipukf mkgckf akrc X   ykfg morupk kedkmkr- ώ ykfg ioiukt N. Acaojcfcsc`kf, ] 9 ∣M M∈J

@krofk ] ⊍ M ∂M ∈ J akf M kedkmkr-ώ ykfg ioiukt N ik`k ]   ioiukt N. ôekfdutfyk ,

acmu`tc`kf ]  suktu suktu kedkmkr-ώ. Icske`kf Kc mkrcskf hcipufkf pkak ] . @krofk Kc morkak ac ] , ik`k Kc sotckp M ∈ J. @krofk Kc

∈ M uftu`

∖

∈ M uftu` sotckp M ∈ J akf M kedkmkr-ώ, ik`k ∤ Kc ∈ M uftu` c 9;

sotckp M ∈ J. Dkac, ∖

∤ Kc ∈ ∣ M 9 {M|M ∈ J} 9 ] c 9;

M∈J

 Kedkmkr-ώ torònce ykfg ioiukt N acsomut kedkmkr- ώ ykfg acmkfguf leoh N. ;.?.

K`sclik Rcechkf Rcechkf akf Ror`keckf Ror`keckf Ekfgsufg K`sclik Rcechkf Rcechkf 4 Icske N somkrkfg `leo`sc hcipufkf-hcipufkf tk` `lslfg. Ik`k torakpkt jufgsc J   ykfg acaojcfcsc`kf pkak N ykfg ioiotk`kf sotckp K ∈ N, sohcfggk suktu oeoiof ac J ( ( K ) toreotk` ac K.

Jufgsc J   acsomut jufgsc pcechkf akf morgkftufg pkak poicechkf hcipufkf K ∈ N, sohcfggk suktu oeoiof ac J ( ( K ) toreotk` ac K. Icske N 9 { X ΰ} iorupk`kf `leo`sc hcipufkf ykfg accfao`s leoh hcipufkf cfaox ΐ. Acaojcfcsc`kf por`keckf ekfgsufg ( acront acront prlaunt  )4

X ΰ

ΰ

iorupk`kf `leo`sc akrc soiuk hcipufkf { x ΰ} ykfg accfao`s leoh ΐ sohcfggk x ΰ∈ X ΰ. ômkgkc nlftlh, dc`k ΐ 9 {;, =}, ik`k acporleoh aojcfcsc kwke por`keckf ekfgsufg X ; x X = akrc auk hcipufkf X ; akf X =. Dc`k z  9 9 {x ΰ} kakekh oeoiof akrc

X ΰ

ΰ

ik`k x ΰ acsomut `llracfkt ò- ΰ akrc z .

Dc`k skekh sktu akrc X ΰ `lslfg ik`k

X ΰ

ΰ

kakekh `lslfg. K`sclik pcechkf oùcvkeof aofgkf

porfyktkkf `lfvorsfyk, ykctu4 Dc`k tcak` kak X ΰ ykfg `lslfg ik`k

X ΰ

ΰ

tcak` `lslfg. Ktks akskr cfc

Mortrkfa ]ussoee iofyomut K`sclik Rcechkf aofgkf K`sclik Ror`keckf (iuetcpecnktcvo kxcli).

;1

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

Rrlmeoi 4 Icske j  4 4 X ↝ S  kakekh kakekh jufgsc lftl (pkak) S . Qufdu``kf mkhwk kak jufgsc g  4 4 S ↝ X  sohcfggk sohcfggk j  g iorupk`kf jufgsc caoftctks pkak S . Mu`tc 4 Icske`kf N 9 { K | ∎ y ∈ S  aofgkf aofgkf K 9 j  „;P{ y }Y} }Y} Rortkik, actufdu``kf K tcak` `lslfg uftu` sotckp K ∈ N. Ackimce somkrkfg K ∈ N, ik`k K 9 j  „;P{ y }Y }Y uftu` suktu y ∈ S . „; x ), uftu` suktu y ∈ S } @krofk K 9 j P{ y }Y }Y ik`k K 9 {x ∈ X  | | y  9 9 j ( ( x x Krtcfyk, K tcak` `lslfg. @krofk j lftl akf y ∈ S  ik`k ik`k torakpkt x ∈ X  sohcfggk sohcfggk y  9 9 j ( (x   ). @oauk , aofgkf kxclik pcechkf, `krofk N `leo`sc hcipufkf-hcipufkf tk` `lslfg ik`k torakpkt jufgsc g  pkak pkak N sohcfggk uftu` suktu y– ∈ g ( ( K ) ik`k y– ∈ K uftu` sotckp K ∈ N. _ftu` sotckp K ∈ N, acpcech jufgsc g  4 4 S ↝ X  aofgkf aofgkf aojcfcsc g ( x ( y   ) 9 x , aofgkf y  9 9 j ( (x   ) akf x ∈ X . Akrc aojcfcsc torsomut, acporleoh4 ∂ y ∈ S  akf g ( K ) 9 {x ∈ K | y 9 j ( x )} ⊍ K

ôhcfggk, dc`k y – ∈ g ( ( K ) ik`k y – ∈ K uftu` sotckp K ∈ N. Dkac, jufgsc g  ioiofuhc ioiofuhc k`sclik pcechkf. Krtcfyk, jufgsc cfc òmorkakkffyk acdkicf leoh k`sclik torsomut. Qork`hcr, actufdu``kf j  g jufgsc caoftctks. Ackimce somkrkfg sotckp y ∈ S  aofgkf aofgkf g ( ( y   ) 9 x , ik`k y  9 9 j ( (x   ) akf morekù4 x ( j  g )( y ) 9 j ( g ( y )) ))

9 j ( x ) 9 y Qorechkt mkhwk j  g iorupk`kf jufgsc caoftctks pkak S .

 ;.:.

Hcipufkf Qorhctufg Rkak mkgckf somoeuifyk toekh acaojcfcsc`kf mkhwk suktu hcipufkf ac`ktk`kf torhctufg (nluftkmeo) dc`k hcipufkf torsomut iorupk`kf akorkh hksce akrc suktu mkrcskf. Dc`k akorkh hksce mkrcskf torsomut morhcfggk (jcfcto), ik`k hcipufkf torsomut morhcfggk (jcfcto). Qotkpc, dc`k akorkh hksce hksce mkrcskf torsomut tk`-morhcfggk (cfjcfcto), ik`k hcipufkf torsomut iufg`cf hcfggk (ktku iufg`cf tk`morhcfggk). @ofyktkkffyk sotckp hcipufkf tk` `lslfg ykfg morhcfggk iorupk`kf akorkh hksce akrc suktu mkrcskf tk` hcfggk. ômkgkc nlftlh, hcipufkf morhcfggk { x ;, …, x f } iorupk`kf akorkh hksce akrc mkrcskf tk` hcfggk ykfg acaojcfcsc`kf aofgkf x c  9 x f  uftu` c  6 6 f ;. ômukh hcipufkf ac`ktk`kf torhctufg tk`-morhcfggk dc`k hcipufkf torsomut skik aofgkf akorkh hksce suktu mkrcskf tk` hcfggk totkpc mu`kf iorupk`kf akorkh hksce soiuk mkrcskf morhcfggk. Hcipufkf mcekfgkf ksec F  kakekh kakekh skekh sktu nlftlh hcipufkf torhctufg tk`-morhcfggk. tk`-morhcfggk. Hcipufkf `lslfg mu`kf iorupk`kf akorkh hksce akrc soiuk mkrcskf. Hcipufkf hcfggk ykfg torhctufg kakekh hcipufkf `lslfg. Dkac poreu acaojcfcsc`kf iofgofkc hcipufkf morhcfggk akf torhctufg sohcfggk hcipufkf `lslfg iorupk`kf hcipufkf morhcfggk akf torhctufg. Aojcfcsc 4 ûktu hcipufkf ac`ktk`kf hcfggk (jcfcto) dc`k hcipufkf torsomut `lslfg ktku iorupk`kf akorkh hksce suktu mkrcskf hcfggk. ûktu hcipufkf ac`ktk`kf torhctufg (nluftkmeo lr aofuiorkmeo) dc`k hcipufkf torsomut `lslfg ktku iorupk`kf akorkh hksce suktu mkrcskf (hcfggk ktku tk` hcfggk).

Akrc aojcfcsc ac ktks acporleoh mkhwk potk akrc somkrkfg hcipufkf torhctufg kakekh torhctufg. Krtcfyk, akorkh hksce akrc somkrkfg jufgsc aofgkf akorkh kske morupk hcipufkf torhctufg kakekh ;

Akorkh hksce mkrcskffyk kakekh 4 {x { x ;, x =, …, x f , x f , x f , x f , ….} ;?

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

torhctufg. Rrlmeoi 4 Icske j  4 4 X ↝ S  jufgsc jufgsc akf K ⊍ X . Dc`k K torhctufg mu`tc`kf mkhwk j ( ( K ) torhctufg. Mu`tc 4 @krofk K torhctufg, ik`k K hcipufkf `lslfg ktku K skik aofgkf akorkh hksce suktu mkrcskf. (c) Dc`k K 9 ∏, nuùp acmu`tc`kf j ( ( K ) 9 ∏ Kfakc`kf j ( ( K ) ≢ ∏, ik`k torakpkt y ∈ j ( ( K ) sohcfggk y 9 j ( (x   ) uftu` suktu x ∈ K. x @lftrkac`sc aofgkf acòtkhuc K 9 ∏. Dkac, j ( ( K ) 9 ∏. (cc) Dc`k K ≢ ∏. @krofk K torhctufg, ik`k K 9 {x c }. Akrc scfc, ik`k

j ( K ) 9 j

({ x c } ) 9 { y c | y c 9

j ( x c ), x c ∈ K} 9 { y c }

Dkac, j ( ( K ) skik aofgkf akorkh hksce suktu mkrcskf, ykctu { y c } aofgkf y c 9 j ( ( x x )c   akf x c ∈ K. @krofk j ( ( K ) skik aofgkf akorkh hksce suktu mkrcskf, ik`k ik`k j ( ( K ) torhctufg.

 Morcùt cfc `lfsop torhctufg acporòfke`kf morakskr`kf kak ktku tcak`fyk suktu `lrosplfaofsc sktu-sktu. Skfg poreu acnktkt kakekh sotckp hcipufkf ykfg mor`lrosplfaofsc sktu-sktu aofgkf hcipufkf morhcfggk kakekh morhcfggk akf sotckp hcipufkf ykfg mor`lrosplfaofsc sktu-sktu aofgkf hcipufkf torhctufg kakekh torhctufg. @krofk hcipufkf mcekfgkf ksec F  kakekh kakekh hcipufkf torhctufg totkpc tk` hcfggk, sotckp hcipufkf ykfg mor`lrosplfaofsc sktu-sktu aofgkf F   hkrusekh torhctufg akf tk` hcfggk. Dkac, hcipufkf tk` hcfggk K torhctufg dc`k akf hkfyk dc`k torakpkt `lrosplfaofsc sktu-sktu kftkrk K akf F . Dc`k hcipufkf tk` hcfggk O iorupk`kf akorkh hksce akrc mkrcskf 5 x f 6, ik`k O mor`lrofsplfaofsc sktu-sktu aofgkf aofgkf prcfscp roùrsc morcùt4 F . Acaojcfcsc`kf jufgsc ϟ  4 4 F ↝ F  aofgkf (;) 9 ; ϟ (;) f + f ). ϟ ( ( f + ;) 9 mcekfgkf torònce i  sohcfggk sohcfggk x i ≢ x c  uftu` sotckp c ≡ ϟ ( ( f @krofk O tk` hcfggk sohcfggk soekeu torakpkt i  akf akf aofgkf prcfscp woee -lraorcfg  uftu` uftu` F , ik`k soekeu torakpkt mcekfgkf ykfg eomch ònce akrc i . @lrosplfaofsc f  xϟ ( f ) kakekh `lrosplfaofsc sktusktu kftkrk F  akf akf O. ôhcfggk, acscipue`kf mkhwk somukh hcipufkf torhctufg akf tk` hcfggk dc`k akf hkfyk dc`k torakpkt `lrosplfaofsc sktu-sktu aofgkf F . Rrlplscsc 4 ôtckp hcipufkf mkgckf akrc hcipufkf torhctufg kakekh torhctufg. Mu`tc 4 Icske`kf O 9 {x f } torhctufg. Ackimce K ⊍ O. Dc`k K 9 ∏, ik`k akrc aojcfcsc K torhctufg Dc`k K ≢ ∏, ik`k ∎x ∈ K. @oiuackf acaojcfcsc`kf 5 y f 6 somkgkc morcùt4 ⎧ x dc`k x f ∃ K y f 9 ⎨ ⎣x f dc`k x f ∈ K Doeks mkhwk K iorupk`kf akorkh hksce akrc 5 y f 6. Dkac K torhctufg.



Rrlplscsc 4 Icske`kf K hcipufkf torhctufg, ik`k hcipufkf soiuk mkrcskf hcfggk akrc K dugk torhctufg. Mu`tc 4 @krofk K torhctufg ik`k torakpkt `lrosplfaofsc sktu-sktu aofgkf F   ktku hcipufkf mkgckffyk. Dkac nuùp acmu`tc`kf mkhwk ^   hcipufkf soiuk mkrcskf hcfggk akrc F   kakekh torhctufg. Icske`kf 5=, >, ?, 7, ;;, …, R `, …6 mkrcskf mcekfgkf prcik, ik`k ∂f ∈ F  torakpkt torakpkt jk`tlrcsksc tufggke akrc f , f 9 = x; .>x = .?x = ...R `x ` ;:

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

aofgkf x c c ∈ F 2 9 F 9 F ∤ {2} akf x ` 6 2. Acaojcfcsc`kf jufgsc j  pkak F pkak F  ykfg ykfg ioiotk`kf mcekfgkf ksec f  ò ò mkrcskf hcfggk 5x 5 x ;, …., x `6 akrc F 2. Ik`k ^   iorupk`kf hcipufkf mkgckf akrc akorkh hksce akrc j . Aofgkf iofggufk`kf prlplscsc 1, ^  torhctufg. torhctufg.

 Rrlplscsc 4 Hcipufkf soiuk mcekfgkf rksclfke kakekh torhctufg Mu`tc 4

⎧ p ⎠ Icske [ 9 ⎨ 0 p , q ∈ T , q ≢ 2 ⎥ hcipufkf mcekfgkf rksclfke akf N `leo`sc mkrcskf hcfggk akrc ⎣ q ⎩ F . @krofk F   torhctufg, ik`k iofurut prlplscsc somoeuifyk sotckp mkrcskf hcfggk akrc F kakekh torhctufg. Dkac N kakekh `leo`sc mkrcskf hcfggk akf torhctufg. @krofk, f

N 9 { K | K 9 {x dc }

c 9;

acaojcfcsc`kf mkrcskf K d

∖ d 9;

, x dc ∈ F }

aofgkf f

K d 9 {x dc }

c 9;

Qorechkt N skik aofgkf akorkh hksce mkrcskf K d

∖ d 9;

, dkac N torhctufg. Icske`kf X ⊍ N.

@krofk N torhctufg, iofurut prlplscsc 1, X 1, X  torhctufg. torhctufg. Icske`kf X 9 { K| K 9 {x pq } , x pq , p, q ∈ F } . ôekfdutfyk acaojcfcsc`kf poiotkkf j 4 X ↝ [ somkgkc morcùt4 , q , ; ↝ p / q p , q , = ↝ ∝ p / q

;, ;, > ↝ 2 Qorechkt, poiotkkf torsomut iorupk`kf poiotkkf akrc hcipufkf pkskfgkf morurutkf (akrc mcekfgkf ksec) 5 p, q , c 6, 6, c  9 9 ;, =, > ò mcekfgkf rksclfke [. @krofk hcipufkf pkskfgkf morurutkf akrc mcekfgkf ksec torhctufg, ik`k [ torhctufg.

 Rrlplscsc 4 Gkmufgkf `leo`sc torhctufg akrc hcipufkf torhctufg kakekh torhctufg Mu`tc 4 Icske`kf N `leo`sc torhctufg akrc hcipufkf torhctufg. Dc`k hcipufkf akeki N soiukfyk `lslfg, ik`k gkmufgkffyk `lslfg akf dugk torhctufg. ôekfdutfyk, acksuisc`kf hcipufkf ac N tcak` soiuk `lslfg, akf `krofk hcipufkf `lslfg tcak` ioimorc`kf pofgkruh pkak gkmufgkf hcipufkf-hcipufkf ac N ik`k akpkt acksuisc`kf hcipufkf-hcipufkf ac N tcak` `lslfg.

ôhcfggk N iorupk`kf akorkh hksce akrc mkrcskf tk` hcfggk Kf

∖ akf f 9;

sotckp Kf   iorupk`kf

∖

akorkh hksce akrc mkrcskf tk` hcfggk x fi i 9; . Qotkpc, poiotkkf akrc 5 f , i 6 ò x fi   kakekh poiotkkf akrc hcipufkf pkskfgkf morurutkf ktks mcekfgkf ksec ò (pkak) gkmufgkf akrc N. @krofk hcipufkf pkskfgkf akrc mcekfgkf ksec kakekh torhctufg ik`k gkmufgkf akrc `leo`sc N dugk torhctufg.

 ;.7.

]oeksc akf Oùcvkeofsc Auk oeoiof x  akf akf y  mcsk mcsk ‘acroeksc`kf– sktu skik ekcf akeki mkfyk` nkrk soportc x  9 9 y , x ∈ y , x ⊍ y , ktku uftu` mcekfgkf x 5 y . ônkrk uiui, icske`kf ] iofyktk`kf roeksc dc`k acmorc`kf x   akf y , x moroeksc ] aofgkf y  actuecs actuecs x  ] ] y , ktku x  tcak` tcak` moroeksc ] aofgkf y . ] ac`ktk`kf roeksc pkak hcipufkf X ;7

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

dc`k ∂x ∈ X  akf akf ∂ y ∈ S , x  ] ] y . Dc`k ] roeksc pkak hcipufkf X , acaojcfcsc`kf grkjc` akrc ] somkgkc4 {5x , y 6 | x  ] ] y } Auk roeksc ] akf ^ ac`ktk`kf skik dc`k ( x ] y ) ⇑ ( x ^ y ), `krofk roeksc actoftu`kf sonkrk tufggke x ] x ^ leoh grkjc`fyk, akf somkec`fyk sotckp hcipufkf mkgckf akrc X × X  iorupk`kf iorupk`kf grkjc` akrc suktu roeksc pkak X . Dkac, roeksc ] pkak X  akpkt akpkt acaojcfcsc`kf ] ⊍ X × X  soakfg`kf soakfg`kf roeksc ] kftkrk hcipufkf X  akf akf kakekh ] ⊍ X × S . S  kakekh ]oeksc ] pkak X  ac`ktk`kf4 ac`ktk`kf4 ;. Qrkfsctcj , dc`k uftu` sotckp x , y ∈ ], x  ] ] y  akf akf y  ] ] z ⇝ x  ] ]  z z =. ^ciotrc , dc`k uftu` sotckp x , y ∈ ], x  ] ] y ⇝ y  ] ] x >. ]ojeo`sc , dc`k uftu` sotckp x ∈ ], x  ] ] x 1. Oùcvkeof , dc`k roeksc torsomut trkfsctcj , sciotrc , akf rojeo`sc . ]oeksc ykfg oùcvkeof pkak X  sorcfg sorcfg acsomut oùcvkeof pkak X . Icske`kf ≫ roeksc oùcvkeof pkak X . _ftu` sotckp x ∈ X , icske`kf Ox  kakekh hcipufkf ykfg kfggltk-kfggltkfyk kfggltk-kfggltkfyk oùcvkeof aofgkf x  (leoh (leoh roeksc ≫ ). Dkac, 9 { y  | | y ≫ x }, }, ∂x ∈ X Ox  9 Dc`k y , z ∈ Ox   ik`k y ≫ x   akf z ≫ x . @krofk ≫ oùcvkeof, ik`k aofgkf iofggufk`kf scjkt trkfsctcj akf sciotrc akrc ≫ acporleoh z ≫ y . ôhcfggk, sotckp auk oeoiof akeki Ox  kakekh oùcvkeof. Dc`k y ∈ Ox   akf z ≫ y , ik`k z ≫ y   akf y ≫ x , ykfg mork`cmkt z ≫ x   akf dugk z ∈ Ox . Dkac sotckp oeoiof X oùcvkeof aofgkf suktu oeoiof Ox , ykfg mork`cmkt oeoiof torsomut dugk oeoiof Ox , 9 ∤ Ox x ∈X

Eomch ekfdut, uftu` sotckp oeoiof x  akf akf y  ac ac X , ;. Dc`k x ≫ y , hcipufkf Ox  akf O y  skik (caoftc`) ktku =. Dc`k x ≫/ y , hcipufkf Ox  akf O y  skecfg eopks Hcipufkf { Ox  | x ∈ X } acsomut hcipufkf oùcvkeof ktku òeks oùcvkeof akrc X  torhkakp torhkakp roeksc ≫. hcipufkf oùcvkeof  ktku òeks oùcvkeof  akrc ôhcfggk X   skecfg kscfg aofgkf gkmufgkf òeks-òeks oùcvkeof torhkakp roeksc ≫. ômkgkc nktktkf, `krofk x ∈ Ox  ik`k tcak` kak òeks oùcvkeof ykfg `lslfg. @leo`sc òeks-òeks oùcvkeof torhkakp roeksc oùcvkeof ≫ acsomut qultcof akrc X   torhkakp ≫, akf tor`kakfg actuecs`kf aofgkf X /≫. Roiotkkf ) akrc X  pkak pkak (lftl) X /≫. fkturke ikppcfg x  Ox acsomut poiotkkf kekic ( fkturke Lporksc mcfor pkak hcipufkf X  kakekh kakekh poiotkkf akrc X × X  ò ò X . ]oeksc oùcvkeof ≫ acsomut `lipktcmoe ( nlipktcmeo ) aofgkf lporksc mcfor + dc`k x ≫ x – akf y ≫ y – ik`k ( x + y ) ≫ ( x –). Akeki hke nlipktcmeo x  + x – + y –). cfc + iofaojcfcsc`kf lporksc pkak qultcoft [ 9 X /≫ somkgkc morcùt4 Dc`k O akf J  kfggltk kfggltk [, acpcech x ∈ O akf y ∈ J  akf akf acaojcfcsc`kf O + J  somkgkc somkgkc O( x x  ++ y  ). @krofk ≫ oùcvkeof, torechkt O + J  hkfyk hkfyk morgkftufg pkak O akf J  akf akf tcak` morgkftufg pkak poicechkf x  ktku ktku y . ;.8.

_rutkf Rkrscke akf Rrcfscp Ik`scike ]oeksc ] pkak hcipufkf X  ac`ktk`kf ac`ktk`kf ;. Qrkfsctcj , dc`k uftu` sotckp x , y ∈ ], x  ] ] y  akf akf y  ] ] z ⇝ x  ] ]  z z =. ^ciotrc , dc`k uftu` sotckp x , y ∈ ], x  ] ] y ⇝ y  ] ] x >. ]ojeo`sc , dc`k uftu` sotckp x ∈ ], x  ] ] x 1. Oùcvkeof , dc`k roeksc torsomut trkfsctcj , sciotrc , akf rojeo`sc . ?. Kftcsciotrc , dc`k uftu` sotckp x , y ∈ ], x  ] ] y  akf akf y ] x ⇝ x  9 9 y ]oeksc ≴ ac`ktk`kf urutkf pkrscke pkak hcipufkf X  (ktku (ktku iofgurut`kf X  sonkrk sonkrk pkrscke) dc`k roeksc torsomut trkfsctcj akf kftcsciotrc. ômkgkc nlftlh, ≡ iorupk`kf urutkf pkrscke pkak mcekfgkf roke, akf ⊍ iorupk`kf urutkf pkrscke pkak `leo`sc hcipufkf ℘. Dc`k ≴ urutkf pkrscke pkak X  akf akf dc`k k ≴ m , `ctk sorcfg iofgktk`kf mkhwk k  iofakhueuc iofakhueuc m ( k k ) ktku m iofgcùtc k (m ). Qor`kakfg `ctk iofgktk`kf mkhwk k ùrkfg akrc m  ktku ktku m eomch pronoaos m pronoaos m k (m  jleelws k jleelws k akrc k . ;8

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

Dc`k O ⊍ X , oeoiof k ∈ O acsomut ;. Oeoiof portkik  (jcrst (jcrst oeoiofs) ktku oeoiof torònce akrc O dc`k ∂x ∈ O, x ≢ k , k ≴ x =. Oeoiof tork`hcr  (ekst (ekst oeoioft) ktku oeoiof tormoskr akrc O dc`k ∂x ∈ O, x ≢ k , x ≴ k >. Oeoiof icfcik e (icfcike oeoioft) akrc O dc`k tcak` kak x ∈ O, x ≢ k , x ≴ k 1. Oeoiof ik`scike  (ikxcike (ikxcike oeoioft) akrc O dc`k tcak` kak x ∈ O, x ≢ k , k ≴ x Dc`k ≴ urutkf ecfokr, oeoiof icfcike pkstc iorupk`kf oeoiof torònce. Qotkpc sonkrk uiui skfgkt ioiufg`cf`kf uftu` ioicec`c oeoiof icfcike ykfg mu`kf oeoiof torònce. ]oeksc ≴ pkak hcipufkf X  ac`ktk`kf, ac`ktk`kf, ;. _rutkf ecfokr  ktku ktku urutkf soaorhkfk , dc`k ∂x , y ∈ X , x ≴ y  ktku ktku y ≴ x  (skekh (skekh sktu). ômkgkc nlftlh, ≡ iorupk`kf urutkf ecfokr pkak hcipufkf mcekfgkf roke, soioftkrk ⊍ mu`kf urutkf ecfokr pkak `leo`sc hcipufkf ℘, somkm dc`k x ∣ y 9 ∏ (skecfg kscfg) ik`k òauk sykrkt torsomut tcak` acpofuhc, ykctu x ⊁ y  akf akf y ⊁ z . =. _rutkf pkrscke ykfg rojeo`sc , dc`k x ≴ x , ∂x ∈ X . ômkgkc nlftlh, ≡ iorupk`kf urutkf ecfokr ykfg rojeo`sc pkak hcipufkf mcekfgkf roke. >. _rutkf pkrscke ykfg ùkt , dc`k tcak` porfkh x ≴ x . ômkgkc nlftlh, 5 iorupk`kf urutkf pkrscke ykfg ùkt pkak ]. _ftu` sotckp urutkf pkrscke ≴ torakpkt aofgkf tufggke urutkf pkrscke ykfg ùkt akf urutkf pkrscke ykfg rojeo`sc. Rrlmeois 4 Icske`kf I 9 {k ∈ |k ≯ ;} ]oeksc ] acaojcfcsc`kf pkak I  somkgkc somkgkc morcùt4 ] m ⇑ m  akpkt akpkt acmkgc leoh k k  ] ;. Kpk`kh ] roeksc urutkf urutkf ecfokr< Dkwkm 4 Rortkik actufdu``kf kpk`kh ] roeksc urutkf pkrscke< c) ] kftcsciotrcs ] y ⇑ y  akpkt akpkt acmkgc leoh x x  ] 9 `x ⇑ ∎` ∈ I  sohcfggk y  9 ] x ⇑ x  akpkt akpkt acmkgc leoh y y  ] 9 ey ⇑ ∎e ∈ I  sohcfggk x  9 Dkac, 9 èx x  9 Acporleoh è  9 9 ;, ykfg mork`cmkt ` 9 „; akf e  9 9 „; ktku ` 9 ; akf e  9 9 ; @krofk k ≯ ;, ∂k ∈ I  ik`k hkrusekh ` 9 ; akf e  9 9 ;. ôhcfggk y  9 9 x  ktku ktku x  9 9 y . Dkac ] scioftrcs. cc) ] trkfsctcj ] y ⇑ y  akpkt akpkt acmkgc leoh x x  ] 9 `x ⇑ ∎` ∈ I  sohcfggk y  9 ] z ⇑ z  akpkt akpkt acmkgc leoh y y  ] 9 ey ⇑ ∎e ∈ I  sohcfggk z  9 Dkac, z  9 9 e`x   ktku z  9 9 px  aofgkf aofgkf p 9 e` ∈  Aofgkf `ktk ekcf z  akpkt akpkt acmkgc leoh x . ôhcfggk x  ] ] z . Dkac ] trkfsctcj Akrc (c) akf (cc) ] kakekh roeksc urutkf pkrscke. @oauk ackimce somkrkfg x , y ∈ I  aofgkf aofgkf x ≢ y , acmu`tc`kf mkhwk x  ] ] y  ktku ktku y  ] ] x Dc`k x  6 6 y , ik`k akpkt actuecs 9 py  + + r ;, aofgkf 2 ≡ r ; 5 y x  9 Dc`k y  6 6 x , ik`k akpkt actuecs 9 qx  + + r =, aofgkf 2 ≡ r = 5 x y  9 ;3

Mkm ; „ Qolrc Hcipufkf

Nlipceoa my 4 @hkorlfc, ^.^c

Dc`k x  akf akf y  mcekfgkf-mcekfgkf mcekfgkf-mcekfgkf prcik, ik`k r ; akf r = tcak` òaukfyk fle. K`cmktfyk x ] y akf y ] x . x . Dkac, ] mu`kf roeksc urutkf ecfokr. =. Qoftu`kf oeoiof torònce oeoiof torònce ⇑ ∂x ∈ I , x ≢ k , k  ] ] x k  oeoiof akpkt acmkgc k  (soiuk (soiuk mcekfgkf akpkt acmkgc leoh k ) ⇑ x  akpkt Dkac, k  9 9 ; iorupk`kf oeoiof torònce. >. Qoftu`kf oeoiof icfcike oeoiof icfcike ⇑ Qcak` kak x ∈ I , x ≢ k , x  ] ] k k  oeoiof akpkt acmkgc x  (mcekfgkf-mcekfgkf (mcekfgkf-mcekfgkf ykfg ⇑ Qcak` kak x ∈ I   sohcfggk k  akpkt tcak` akpkt acmkgc leoh mcekfgkf ekcf ònukec leoh mcekfgkf ykfg skik) Dkac k  mcekfgkf mcekfgkf prcik akf k  9 9 ; iorupk`kf oeoiof icfcike

 Nlftlh 4 ]95 K 9  9 ; iorupk`kf oeoiof torònce, somkm ∂x ∈ K, x ≢ ; ik`k ; 5 x • k  9 9 ; iorupk`kf oeoiof icfcike, somkm tcak` kak x ∈ K, x ≢ ; sohcfggk x  5 5 ; • k  9

 Rrcfscp morcùt cfc oùcvkeof aofgkf k`sclik pcechkf akf eomch sorcfg acgufk`kf. Rrcfscp Ik`scike Hkusaúrj 4 Icske ≴ urutkf pkrscke pkak X . Ik`k torakpkt hcipufkf mkgckf ik`scike akrc X  ykfg ykfg torurut ecfokr leoh ≴ . Aofgkf `ktk ekcf, hcipufkf mkgckf ^   akrc X   ykfg torurut ecfokr leoh ≴ akf ioicec`c scjkt dc`k ^ ⊍ Q ⊍ X  akf akf Q  torurut torurut ecfokr leoh ≴ ik`k ^  9 9 Q . ;.3.

_rutkf ]kpc akf Lracfke Qorhctufg ûktu roeksc urutkf ecfokr ùkt 5 pkak hcipufkf X  acsomut acsomut urutkf rkpc ( woee woee lraorcfg  ) uftu` X ktku ac`ktk`kf iofgurutkf X  aofgkf aofgkf rkpc dc`k sotckp hcipufkf mkgckf tk` `lslfg akrc X  ioiukt ioiukt suktu oeoiof portkik (oeoiof torònce). Dc`k ackimce X 9 F   akf 5 morkrtc ‘ùrkfg akrc–, ik`k F   torurut rkpc aofgkf 5. Ac scsc ekcf, hcipukf soiuk mcekfgkf roke ] tcak` torurut rkpc aofgkf roeksc ―ùrkfg akrc’. Rrcfscp morcùt cfc iorupk`kf k`cmkt akrc k`sclik pcechkf akf akpkt actufdu``kf dugk oùcvkeof aofgkffyk (mkgkcikfk yk. ∎2 ∈  sohcfggk x  + + 2 9 x , uftu` sotckp x ∈  K1. ∂x ∈  , ∎! w ∈  sohcfggk x  + + w  9 9 2 K?. xy  9 9 yx K:. ( xy )z  9 9 x ( ( yz ) xy K7. ∎; ∈  sohcfggk ; ≢ 2, akf x .; .; 9 x ∂x ∈  K8. ∂x ∈  , x ≢ 2, ∎w ∈  sohcfggk xw  9 9 ; K3. x ( ( y + + z ) 9 xy  + + xz

Hcipufkf ykfg ioiofuhc k`sclik ac ktks acsomut ekpkfgkf (torhkakp lporksc + akf .). Acporleoh akrc K; mkhwk oeoiof 2 kakekh tufggke. Oeoiof w   pkak K1 dugk tufggke akf acfltksc`kf aofgkf ‘„ x x –.–. Oeoiof ; pkak K7 ufc` akf oeoiof w   pkak K8 dugk ufc` akf acfltksc`kf aofgkf ‘ x  „;– @oiuackf acaojcfcsc`kf pofgurkfgkf akf poimkgckf somkgkc morcùt4 x 9 xy ∝; „ y  9 9 x  + + („ ) akf x  „ y y K`sclik _rutkf _rutkf Icske`kf R  kakekh kakekh hcipufkf mcekfgkf roke plsctcj, R  ioiofuhc ioiofuhc k`sclik morcùt4 M;. x , y ∈ R ⇝ x  + + y ∈  M=. x , y ∈ R ⇝ x.y ∈  M>. x ∈  ⇝ (x 9 2) ktku ( x ) ktku ( x ) x ∈ R x ∈ R

ûktu scstoi ykfg ioiofuhc k`sclik ekpkfgkf akf k`sclik urutkf acsomut ekpkfgkf torurut (lraoroa jcoea). ôhcfggk mcekfgkf roke kakekh ekpkfgkf torurut. Mogctu dugk aofgkf hcipufkf mcekfgkf rksclfke iorupk`kf ekpkfgkf torurut. Akeki ekpkfgkf torurut acaojcfcsc`kf x  5 5 y  ykfg ykfg morkrtc x  „ „ y ∈ R . @ctk iofuecs`kf ‘ x ≡ y – uftu` ‘x 5 y – ktku ‘x 9 y– . Hcipufkf mcekfgkf roke aofgkf roeksc 5 iorupk`kf hcipufkf torurut ecfokr. Morakskr`kf k`sclik urutkf acporleoh4 k. ( x 5 y ) & ( z 5 w ) ⇝ x  + + z  5 5 y  + + w z 5 m. (2 5 x  5 5 y ) & (2 5 z  5 5 w ) ⇝ xz  5 5 yw n. Qcak` kak x  sohcfggk sohcfggk x  5 5 x . Mu`tc 4 k. _ftu` ioimu`tc`kf x  + + z  5 5 y  + + w  nuùp nuùp acmu`tc`kf ( + w ) „ ( x + z ) ∈ R . y  + x  + @krofk x  5 5 y  ik`k ik`k y  „ „ x ∈ R @krofk z  5 5 w  ik`k ik`k w  „ „ z ∈ R

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

@krofk y  „ „ x , w  „ „ z ∈ R  ik`k ik`k morakskr`kf k`sclik M; acporleoh 9 y + w „ x „ z  9 9 ( ) „ ( x + z ) ∈ R . y „ x + w „ z  9 y + w m. _ftu` ioimu`tc`kf xz  5 5 yw  nuùp nuùp acmu`tc`kf yw  „ „ xz @krofk 2 5 x  5 5 y  ik`k ik`k y  „ „ x ∈ R  akf akf x  „ „ 2 9 x ∈ R @krofk 2 5 z  5 5 w  ik`k ik`k w  „ „ z ∈ R  akf akf w  „ „ 2 9 w ∈ R @krofk y  „ „ x , y , w  „ „ z , akf w ∈ R  ik`k ik`k morakskr`kf M; akf M= acporleoh4 ( y „ „ x ) + x ( ( w „ z ) 9 yw  „ „ wx  + + wx  „ „ xz  9 9 yw  „ „ xz ∈ R w ( w „ n. Kfakc`kf kak x   sohcfggk x 5 x . @krofk x 5 x   ik`k x „ x ∈ R . K`cmktfyk 2 ∈ R. @lftrkac`sc aofgkf acòtkhuc R   hcipufkf mcekfgkf plsctcj. Dkac pofgkfakckf skekh ykfg mofkr tcak` kak x  sohcfggk sohcfggk x  5 5 x .  Aojcfcsc (ûproiui akf Cfjciui) 4 Icske`kf ^  ⊍ ⊍  . * ;. k  mktks ktks ^ , dc`k x ≡ k * uftu` sotckp x ∈ ^ =. k  mktks mktks ktks torònce akrc ^ , dc`k (c) k  mktks mktks ktks ^ (cc) Dc`k m  mktks mktks ktks ik`k k ≡ m Fltksc 4 k  9 9 sup( ^ | x ∈ ^ } ^ ) 9 sup x  9 sup{x  | x ∈^ *

>. n  mktks mkwkh ^ , dc`k n ≡ x  uftu` uftu` sotckp x ∈ ^ 1. n  mktks mktks mkwkh tormoskr akrc ^ , dc`k (c) n  mktks mktks mkwkh ^ (cc) Dc`k a  mktks mktks mkwkh ik`k a ≡ n Fltksc 4 n  9 9 cfj( ^ | x ∈ ^ } ^ ) 9 cfj x  9 cfj{x  | *

x ∈^

Rorhktc`kf ceustrksc morcùt4 „ ο k  „ x 2 k Dc`k k  mktks mktks ktks torònce, ik`k uftu` sotckp ο 6 2 k`kf soekeu kak x 2 sohcfggk x 2 6 k  „ „ ο. Krtcfyk, „ ο mu`kf mktks ktks `krofk kak x 2 ykfg fcekcfyk eomch moskr (ktks) akrcfyk. k  „ n x 2 n+ο Dc`k n  mktks mktks mkwkh tormoskr, ik`k uftu` sotckp ο 6 2 k`kf soekeu kak x 2 sohcfggk x 2 5 n + ο. Krtcfyk n  + + ο mu`kf mktks mkwkh `krofk kak x 2 ykfg fcekcfyk eomch ònce (mkwkh) akrcfyk. Akrc auk ceustrksc ac ktks, ik`k aojcfcsc suproiui akf cfjciui akpkt acfyktk`kf akeki fltksc iktoiktcs somkgkc morcùt4 ;. k  mktks mktks ktks torònce akrc ^ , dc`k (c) ∂x ∈ ^ , x ≡ k (cc) ∂ο 6 2, ∎x 2 ∈ ^ , ∀ x 2 6 k  „ „ ο =. n  mktks mktks mkwkh tormoskr akrc ^ , dc`k (c) ∂x ∈ ^ , n ≡ x (cc) ∂ο 6 2, ∎x 2 ∈ ^ , ∀ x 2 5 n  + + ο

==

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

Nlftlh ^lke 4 Icske`kf K akf M tormktks. Mu`tc`kf mkhwk sup(  K + M ) 9 sup( K ) + sup( M ) aofgkf + m  | | k ∈ K akf m ∈ M} K + M 9 {k  + Dkwkm 4 Icske p 9 sup( 9 sup( M ). @krofk K ) akf q  9 p 9 sup( K ) ⇑ .( c ) p ≯ k , ∂k ∈ K

.( cc ) ∂ο 6 2, ∎k 2 ∈ K ∀ k 2 6 p ∝ ο = akf q 9 sup( M ) ⇑ .( ccc ) q ≯ m , ∂m ∈ M .( cv ) ∂ο 6 2, ∎m2 ∈ M ∀ m2 6 q ∝ ο = Akrc (  ) ) acporleoh c c akf ( ccc ccc + m , ∂k ∈ K akf m ∈ M. Dkac, p + q ≯ k  + + m , ∂k  + + m ∈ K + M ……………….. (*) p + q ≯ k  + Dkac p + q  mktks mktks ktks akrc K + M Akrc ( cc ) acporleoh c ) c akf ( cv cv ) „ ο ……………………………. (**) ∂ο 6 2, ∎k 2 ∈ K akf m 2 ∈ M sohcfggk k 2 + m 2 6 ( p + q Akrc (*) akf (**) tormu`tc mkhwk p + q  9 9 sup( K + M )

 K`sclik @oeofg`kpkf @oeofg`kpkf ôtckp hcipufkf mkgckf akrc  ykfg tcak` `lslfg akf tormktks ac ktks ioipufykc mktks ktks torònce ( suproiui ). suproiui ôtckp hcipufkf mkgckf akrc  ykfg tcak` `lslfg akf tormktks ac mkwkh ioipufykc mktks mkwkh tormoskr ( cfjciui ). cfjciui =.=.

Mcekfgkf ]oke ykfg Acporeuks _ftu` ioiporeuks scstoi mcekfgkf roke  , ik`k actkimkh`kf oeoiof ∖ akf „ ∖. Hcipufkf mkru cfc acsomut hcipufkf mcekfgkf roke ykfg acporeuks  * . ]oeksc 5 acporeuks aojcfcscfyk pkak  * iofdkac „ ∖ 5 x  5 5 ∖ uftu` sotckp x ∈  . @oiuackf acaojcfcsc`kf ∂x ∈  . + ∖ 9 ∖, „ ∖ 9 „ ∖ x  + x  „ dc`k x  6 6 2 x .∖ 9 ∖ .„ ∖ 9 „ ∖ dc`k x  6 6 2 x .„ akf ∖ + ∖ 9 ∖, „ ∖ „ ∖ 9 „ ∖ ∖.( »∖ »∖ ) 9 »∖, „ ∖.( »∖ »∖ ) 9 ∞ ∖ ôakfg`kf lporksc ∖ „ ∖ tcak` acaojcfcsc`kf. Qotkpc, 2.∖ 9 2. ^kekh sktu ògufkkf  * kakekh uftu` iofaojcfcsc`kf sup( ^ ^ ) akf cfj( ^ ^ ) uftu` soiuk ^ hcipufkf hcipufkf mkgckf akrc  ykfg tcak` `lslfg ^ . Dc`k ^  tcak` tcak` tormktks ac ktks, ik`k sup( ^ ^ ) 9 ∖ Dc`k ^  tcak` tcak` tormktks ac mkwkh, ik`k cfj( ^ ^ ) 9 „ ∖ ∏ )   9 „ ∖. Dkac, acaojcfcsc`kf acaojcfcsc`kf sup( ∏   =.>.

Mcekfgkf Ksec akf Mcekfgkf ]ksclfke somkgkc ûmsot akrc Mcekfgkf ]oke @ctk toekh iofggufk`kf scimle ; mu`kf hkfyk uftu` iofyktk`kf mcekfgkf ksec portkik totkpc dugk mcekfgkf roke ‘sposcke– soportc ykfg actuecs`kf akeki k`sclik K7. Rortkik, acaojcfcsc`kf mcekfgkf roke > somkgkc ; + ; + ;. Aofgkf aoic`ckf `ctk akpkt iofaojcfcsc`kf mcekfgkf roke ykfg mor`lrosplfaofsc mor`lrosplfaofsc aofgkf soimkrkfg mcekfgkf ksec. Morakskr`kf prcfscp roùrscj ik`k torakpkt somukh jufgsc ϟ 4  ↝  ykfg ioiotk`kf mcekfgkf ksec ò mcekfgkf roke aofgkf aojcfcsc somkgkc morcùt4 =>

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

ϟ (;) (;) 9 ; ϟ ( ( f + ;) 9 ϟ ( (f f + f  ) + ; (Nktktkf4 ; iofyktk`kf mcekfgkf roke pkak scsc `kfkf akf mcekfgkf ksec pkak scsc `crc) @ctk hkrus iofufdu``kf mkhwk jufgsc ϟ kakekh jufgsc sktu-sktu. _ftu` iofufdu``kffyk nuùp actufdu``kf mkhwk jufgsc ϟ  ilfltlf. ilfltlf.

Mu`tc 4 K`kf acmu`tc`kf ϟ  ilfltlf ilfltlf fkc`. Krtcfyk, dc`k p 5 q  ik`k ik`k ϟ ( ( p  ) 5 ϟ ( (q q  ) aofgkf p , q ∈  . @krofk p 5 q  ik`k ik`k q  9 9 p + f  uftu` uftu` sotckp f ∈  K`kf acmu`tc`kf mkhwk ϟ ( ( p  ) 5 ϟ ( ( p + f ) Mu`tc aofgkf cfau`sc _ftu` f  9 9 ;, acporleoh ( p  ) 5 ϟ ( ( p + ; ) 9 ϟ ( ( p  ) + ; ϟ ( Dkac, porfyktkkf mofkr mofkr uftu` f  9 9 ;. Ksuisc`kf porfyktkkf porfyktkkf mofkr uftu` uftu` f  9 9 `, ykctu morekù ϟ ( ( p  ) 5 ϟ ( ( p + ` ) K`kf acmu`tc`kf porfyktkkf porfyktkkf mofkr uftu` uftu` f  9 9 ` + ;, ϟ ( ( p + ( ` + ;)) 9 ϟ (( (( p + ` ) + ;) 9 ϟ ( ( p + ` ) + ; 6 ϟ ( ( p  ) + ; 6 ϟ ( ( p  ) Dkac, ϟ ( ( p  ) 5 ϟ ( ( p + ( ` + ;)). Krtcfyk porfyktkkf mofkr uftu` f  9 9 ` + ;. Morakskr`kf cfau`sc ac ktks, tormu`tc ϟ  ilfltlf. ilfltlf. Aofgkf `ktk ekcf, tormu`tc ϟ  sktu-sktu. sktu-sktu.

 ôekfdutfyk, dugk akpkt acmu`tc`kf (aofgkf cfau`sc iktoiktc`k) mkhwk ( p + q ) 9 ϟ ( ( p  ) + ϟ ( ( q ϟ ( q ) akf ϟ ( ( pq ) 9 ϟ ( ( p  ) ϟ ( ( q q ) Mu`tc 4 Rortkik4 Icske`kf q  9 9 f  , , ∂f ∈  . Acporleoh ϟ ( ( p + f ) 9 ϟ ( ( p  ) + ϟ ( (f f  ) _ftu` f  9 9 ; ϟ ( p + ;) 9 ϟ( p ) + ; 9 ϟ( p ) + ϟ(;) Dkac porfyktkkf mofkr mofkr uftu` f  9 9 ;. Ksuisc`kf porfyktkkf porfyktkkf mofkr uftu` uftu` f  9 9 `, ykctu ϟ ( ( p + ` ) 9 ϟ ( ( p  ) + ϟ ( (`   ) K`kf acmu`tc`kf porfyktkkf porfyktkkf mofkr uftu` uftu` f  9 9 ` + ;, ykctu4 ;) ϟ ( p + ( ` + ;)) 9 ϟ (( p + ` ) + ;)

9 ϟ ( p + ` ) + ; 9 ϟ ( p ) + ϟ ( ` ) + ; 9 ϟ ( p ) + ϟ ( ` + ;) Dkac porfyktkkf mofkr mofkr f  9 9 ` + ;. Morakskr`kf prcfscp cfau`sc, tormu`tc tormu`tc mkhwk ( p + q ) 9 ϟ ( ( p  ) + ϟ ( (q ϟ ( q  ) @oauk4 Icske`kf q  9 9 f  , , ∂f ∈  . Acporleoh

ϟ ( ( pf ) 9 ϟ ( ( p  ) ϟ ( (f f  ) =1

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

_ftu` f  9 9 ; ( p ;) 9 ϟ ( ( p  ) 9 ϟ ( ( p  ); 9 ϟ ( ( p  )ϟ (;) (;) ϟ ( Dkac porfyktkkf mofkr mofkr uftu` f  9 9 ;. Ksuisc`kf porfyktkkf porfyktkkf mofkr uftu` uftu` f  9 9 `, ykctu4 ϟ ( ( p` ) 9 ϟ ( ( p  )ϟ ( (`   ) K`kf acmu`tc`kf porfykkkf morekù uftu` uftu` f 9 ` + ;, ykctu4 ϟ ( p( ` + ;)) 9 ϟ ( p` + p )

9 ϟ ( p` ) + ϟ ( p ) 9 ϟ ( )ϟ( ` ) + ϟ ( p ) 9 ϟ ( p ) (ϟ ( ` ) + ;) 9 ϟ ( p)ϟ ( ` + ;) Dkac porfyktkkf mofkr mofkr f  9 9 ` + ;. Morakskr`kf prcfscp cfau`sc, tormu`tc tormu`tc mkhwk ϟ ( ( pq ) 9 ϟ ( ( p  ) ϟ ( ( q q )  ôhcfggk ϟ  ioimorc`kf ioimorc`kf `lrosplfaofsc sktu-sktu kftkrk hcipufkf mcekfgkf ksec aofgkf sumsot mcekfgkf roke. Krtcfyk kak `lrosplfaofsc sktu-sktu kftkrk hcipufkf mcekfgkf ksec aofgkf hcipufkf mkgckf akrc mcekfgkf roke ykfg iofgkwot`kf lporksc pofduiekhkf, por`keckf, akf roeksc 5. Dkac  akpkt acpkfakfg somkgkc hcipufkf mkgckf akrc  . Aofgkf iofaojcfcsc`kf soecsch mcekfgkf-mcekfgkf ksec, ik`k acporleoh hcipufkf mcekfgkf muekt  ykfg iorupk`kf sumsot akrc  . @oiuackf iofaojcfcsc`kf poimkgckf mcekfgkf-mcekfgkf muekt acporleoh hcipufkf mcekfgkf rksclfke  . Dkac hcipufkf mcekfgkf roke  cslilrj ; aofgkf  ,  , akf . Rrlplscsc 4 ôtckp hcipufkf torurut cslilrj aofgkf  ,  , akf  . K`sclik Krnhcioaos Krnhcioaos 4 _ftu` sotckp x  ∈ 5 f ∈  , kak f ∈  sohcfggk x  5 (ôtckp mcekfgkf roke ykfg acsomut`kf, pkstc kak mcekfgkf muekt ykfg eomch moskr akrcfyk) Mu`tc 4 Dc`k x  5 5 2, ackimce f  9 9 2. Dc`k tcak` aoic`ckf, aoic`ckf, acaojcfcsc`kf hcipufkf hcipufkf ^ 9 {` ∈ |` ≡ x } , x ≯ 2 ôhcfggk hcipufkf ^  ioipufykc ioipufykc mktks ktks ykctu x . Akrc aojcfcsc ac ktks, ^  tcak` tcak` `lslfg `krofk pkecfg tcak` ^   ioiukt ; oeoiof ykctu x . @krofk ^  tcak` tcak` `lslfg akf tormktks ac ktks ik`k ^ ioipufykc suproiui ( k`sclik ). Icske`kf k`sclik òeofg`kpkf 9 sup( ^ y  9 ^ ) ∝ ;= mu`kf mktks ktks. Leoh `krofk ctu kak ` ∈ ^  sohcfggk @krofk y  suproiui, suproiui, ik`k y  ∝ sohcfggk ` 6 y ∝ ;=

Dc`k òauk ruks actkimkh ;, acporleoh acporleoh ` + ; 6 y + =; 6 y @krofk y  suproiui, suproiui, ik`k ` + ; ∃ ^ . @krofk ` + ; mcekfgkf muekt ykfg mu`kf oeoiof ^ , ik`k ` + ; 6 x Dkac acpcech f  9 9 ` + ; ∈  . ( nlle !!) nlle !!)

 K`cmkt 4 Qorakpkt suktu mcekfgkf mcekfgkf rksclfke ackftkrk ackftkrk auk mcekfgkf mcekfgkf roke soimkrkfg Aofgkf `ktk ekcf, dc`k x  5 5 y  ik`k ik`k ∎r ∈  sohcfggk x  5 5 r  5 5 y . ; Oùcvkeof,

kak `lrosplfaofsc ;-; =?

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

@lfstru`sc mu`tc 4 Acòtkhuc x  5 5 r  5 5 y , morkrtc acnkrc mcekfgkf f , q ∈  sohcfggk r 9

⎧ f Acaojcfcsc`kf= hcipufkf ^ 9 ⎨f ∈  + | ≯ q ⎣ @krofk ^   tormktks ò mkwkh akf ^   tcak`

Ac ekcf pchk` p ∝;

p ∝ ; q

5 y  ktku y 6

p ∝ ;

x 9 y ∝( y ∝ x ) 5

q p q

q

aofgkf x 5

f

f akf 5 y . q q

⎠

ioicec`c mktks mkwkh, ykctu y . y ⎥ . Akrc scfc doeks ^  ioicec`c

⎩ `lslfg ik`k ^   ioicec`c mktks mkwkh tormoskr >,

icske`kf p 9 cfj( ^ ik`k ^ ) akf p ∈  + . @krofk p ∈ ^  ik`k Leoh `krofk ctu

f

p q

≯

ktku y ≡

p q

. ôekcf ctu p „ ; ∃ ^ .

.

∝( y ∝ x ) 5

p ∝; q

5 y . Dkac

p q

∝ ( y ∝ x ) 5

p ∝; q

ktku

; ⇑ q 6 ( y ∝ x )∝; . Mcekfgkf q   cfcekh ykfg ackimce somkgkc q q q mcekfgkf muekt ykfg eomch moskr 1 akrc ( „ x ) „; y  „ Mu`tc 4 Dc`k x ≯ 2, ik`k uftu` sotckp mcekfgkf roke (  y  „ „ x ) „; kak q ∈  sohcfggk ; ; q 6 ( y ∝ x )∝; ktku y ∝ x 6 ⇑ 5 y ∝ x q q Icske`kf ⎧ ⎠ f ^ 9 ⎨f ∈  + | ≯ y ⎥ q ⎣ ⎩ torsomut ^  tormktks tormktks ò mkwkh. @krofk ^ ≢ ∏ akf ^ ≢ ∏ `krofk pkecfg tcak` y ∈ ^ . Akrc aojcfcsc ^  torsomut tormktks ò mkwkh ik`k ^  ioicec`c ioicec`c cfjciui, icske`kf p 9 cfj( ^ ik`k ^ ). @krofk p ∈ ^  ik`k p p ≯ y  ktku y ≡ q q p

∝

5 ( y ∝ x ) ⇑ y ∝ x 6

@krofk p ∈ ^  ik`k ik`k p „ ;∃ ^ . Leoh `krofk ctu, p ∝ ; p ∝ ; 5 y  ktku y 6 q q ôhcfggk ∝; p p ; p ∝; 5 y ≡ akf x 9 y ∝ ( y ∝ x ) 5 ∝ 9 q q q q q Dkac, ∝; p ∝ ; akf x 5 5 y . q q p ∝ ; Akrc scfc acpcech r 9 akf y . ∈  ykfg doeks toreotk` ackftkrk x  akf q Dc`k x  5 5 2, ackimce f ∈  sohcfggk f  6 6 „ x ktku f  + + x  6 6 2. Dkac, iofurut poimu`tckf ac ktks, kak x ktku + x  5 5 r  5 5 y  5 5 y  + + f  ktku ktku x  5 5 r  „ „ f  5 5 y . Doeks r  „ „ f  mcekfgkf mcekfgkf rksclfke. r  ∈ ∈  aofgkf f  + 

= Rofaojcfcsckf

cfc acakskr`kf pkak hcpltoscs mkhwk y  pkecfg pkecfg moskr. Dkac, acmoftu` hcipufkf aofgkf kfggltk-kfggltk mcekfgkf rksclfke akf morfcekc eomch moskr akrc y . Caofyk kakekh kgkr hcipufkf ioipufykc cfjciui, icske`kf p. > Morakskr`kf K`sclik @oeofg`kpkf 1 Morakskr`kf K`sclik Krnhcioaos =:

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

=.1.

Mkrcskf Mcekfgkf ]oke Mkrcskf mcekfgkf roke 5x f 6 kakekh suktu jufgsc ykfg ioiotk`kf sotckp mcekfgkf ksec f ò mcekfgkf roke x f . Mcekfgkf roke e  ac`ktk`kf ac`ktk`kf ecict mkrcskf 5x f 6 dc`k uftu` sotckp ο  plsctcj plsctcj torakpkt mcekfgkf sohcfggk uftu` sotckp f ≯ F  morekù morekù |x f  „ e | 5 ο . ônkrk iktoiktcs, F  sohcfggk e 9 eci x f ⇑ ( ∂ο 6 2 ) ( ∎F ) ∀ ( f ≯ F ) ( x f ∝ e 5 ο )

Mkrcskf mcekfgkf roke 5 x f 6 acsomut mkrcskf Nkunhy dc`k uftu` sotckp ο  plsctcj plsctcj torakpkt mcekfgkf F mkrcskf Nkunhy  dc`k sohcfggk uftu` sotckp f , i ≯ F  morekù morekù |x f  „ x i | 5 ο . Dkac x f mkrcskf Nkunhy ⇑ ( ∂ο 6 2 ) ( ∎F ) ∀ ( f , i ≯ F ) ( x f ∝ x i 5 ο ) @rctorck Nkunhy 4 Mkrcskf mcekfgkf roke 5 x f 6 `lfvorgof? dc`k akf hkfyk dc`k 5 x f 6 mkrcskf Nkunhy. Fltksc ecict cfc acporeuks uftu` ioiksu``kf mcekfgkf ∖ (pkak  * )somkgkc morcùt. morcùt. eci x f 9 ∖, dc`k ∂∊ 6 2, ∎F ∀ ∂f ≯ F , x f 6 ∊

eci x f 9 ∝∖, dc`k ∂∊ 6 2, ∎F ∀ ∂f ≯ F , x f 5 ∝ ∊ Icske`kf ^ ( ( e e, ο  ) 9 {x ∈  4 |x  „ „  e e | 5 ο}, ik`k 9 eci x f , dc`k ∂ο  6 6 2, ∎ F , ∀ x f ∈ ^ ( ( e e, ο  ), ∂f ≯ F e  9 Rkak `ksus cfc e  kakekh kakekh tctc` ecict ( neustor ) akrc 5x f 6. Dkac tctc` e  ac`ktk`kf ac`ktk`kf tctc` ecict ( Neustor neustor  plcft plcft Neustor ) akrc mkrcskf 5 x f 6 dc`k ∂ο  6 6 2, torakpkt soac`ctfyk sktu tctc` x  F  sohcfggk |x  F  „ e| 5 ο . Mcekikfk Rlcft * `lfsop cfc acporeuks pkak  , e 9 ∖ tctc` ecict akrc mkrcskf 5 x f 6, dc`k ∂∊ 6 2 torakpkt pkecfg soac`ct sktu tctc` x  F  sohcfggk x  F ≯ ∊. Dc`k 5x f 6 kakekh suktu mkrcskf, acaojcfcsc`kf ecict suporclr somkgkc eci x f 9 eci sup x f 9 cfj su sup x ` 9 cfj{sup{ x ;, x = , ....}, sup{ x = , x > , ...} , ...} : f

` ≯ f

^cimle eci akf eci sup òaukfyk acgufk`kf uftu` ecict suporclr. Mcekfgkf roke e   ac`ktk`kf ecict suporclr akrc mkrcskf 5 x f 6 dc`k akf hkfyk dc`k 4 (c) ∂ο  6 6 2, ∎f ∀ ∂` ≯ f , x ` 5 e  + + ο (cc) ∂ο  6 6 2 akf ∂f , ∎` ≯ f , x ` 6 e  „ „ ο  (kak (kak pkecfg soac`ct sktu tctc` x ` sohcfggk x ` 6 e  „ „ ο _ftu` mcekfgkf roke ykfg acporeuks ∖ kakekh ecict suporclr 5 x f 6 dc`k akf hkfyk dc`k ∂∊ akf f torakpkt ` ≯ f  soaoic`ckf soaoic`ckf sohcfggk x ` ≯ ∊. Mcekfgkf roke „ ∖ kakekh ecict suporclr 5 x f 6 dc`k akf hkfyk dc`k „ ∖ 9 eci x f . Ecict cfjorclr acaojcfcsc`kf somkgkc eci x f 9 ececi cf cfj x f 9 sup cfj x ` 9 sup{cfj{x ;, x = , ....}, cf cfj{ x = , x > , ...} , ...} f

` ≯ f

^cjkt-scjkt4 ;) eci ( ∝x f ) 9 ∝ eci x f =) eci x f ≡ eci x f >) eci x f 9 e (pkak  * ) ⇑ e 9 eci x f 9 eci x f

1) eci x f + eci yf ≡ eci ( x f + y f ) ≡ eci x f + eci y f



≡ eci ( x f + y f ) ≡ eci x f + eci y f =.?.

Hcipufkf Qormu`k akeki Mcekfgkf ]oke ôekfg mu`k ( k ) 9 {x | k 5 x 5 m }. }. Fltksc M( x k, m x, α  ) 9 { y | |x „ y | 5 α } 9 ( x x „ α , x + α  ) iofyktk`kf mlek ykfg morpuskt ac x  akf akf mordkrc-dkrc α . Akeki mcekfgkf roke, M( x ) kakekh soekfg mu`k. x, α

? Ecictfyk : Ackftkrk

kak suproiui-suproiui suproiui-suproiui torsomut, ikfk`kh cfjciuifyk< =7

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

Aojcfcsc 4 Hcipufkf L ac`ktk`kf tormu`k ac  dc`k ∂x ∈ L , ∎α 6 2 ∀ M( x , α ) ⊍ L

Aofgkf `ktk ekcf, ∂x ∈ L soekeu torakpkt soekfg mu`k C  ykfg ykfg ioiukt x  sohcfggk sohcfggk C ⊍ L. ôekfg mu`k kakekh nlftlh akrc hcipufkf tormu`k. Hcipufkf `lslfg akf  dugk nlftlh akrc hcipufkf tormu`k. Rrlplscsc 4 Dc`k L; akf L= tormu`k ik`k L; ∣ L= tormu`k. Mu`tc 4 Ackimce somkrkfg x ∈ L; ∣ L=. K`kf actufdu``kf ∎α  6 6 2 sohcfggk M( x x, α  ) ⊍ L; ∣ L=. @krofk x ∈ L; ∣ L=, ik`k x ∈ L; akf x ∈ L=. @krofk L; akf L= tormu`k ik`k ∎α ;, α = 6 2 sohcfggk M( x x, α ; ) ⊍ L; akf M( x x, α = ) ⊍ L=. Krtcfyk |t  „ „ x | 5 α ; akf |t  „ „ x | 5 α = α; , α = ), acporleoh Aofgkf iofgkimce α  9 9 icf( α |t  „ „ x | 5 α  5 5 α ; akf |t  „ „ x | 5 α  5 5 α = Aofgkf `ktk ekcf, ∂t ∈ M( x 9 icf{α ;, α =}. x , α  ) morekù t ∈ M( x x, α ; ) akf t ∈ M( x x , α = ), aofgkf α  9 Dkac M( x x , α  ) ⊍ L; akf M( x x , α  ) ⊍ L=. ôhcfggk M( x x, α  ) ⊍ L; ∣ L=.



K`cmkt 4 Crcskf soduiekh morhcfggk hcipufkf tormu`k kakekh tormu`k. Mu`tc 4 f

Icske Lc  , c  9 9 ;, …, f  hcipufkf hcipufkf tormu`k. K`kf acmu`tc`kf

∣L

c

tormu`k. Ik`k,

c 9;

f

x ∈ ∣ Lc ⇑ .x ∈ Lc , c 9 ;,  , f c 9;

⇑ .∎α c 6 2 ∀ M( x , α c ) ⊍ Lc , c 9 ;,  , f ;,  , f ⇑ .M( x , α ) ⊍ Lc , α 9 icf{α c }, c 9 ;,

f

Dkac,

∣L

c

tormu`k.

c 9;

Kflthor vorsclf vorsclf (ketorfkto slef) 4 f

Ackimce somkrkfg x ∈ ∣ Lc , ik`k x ∈ Lc  aofgkf Lc tormu`k ∂c . c 9;

@krofk x ∈ L; akf L; tormu`k, ik`k torakpkt α ; 6 2 sohcfggk M( x x , α ; ) ⊍ L; @krofk x ∈ L= akf L= tormu`k, ik`k torakpkt α = 6 2 sohcfggk M( x x, α = ) ⊍ L= Aoic`ckf sotorusfyk. @krofk x ∈ Lf  akf Lf  tormu`k, ik`k torakpkt α f 6 2 sohcfggk M( x x, α f  ) ⊍ Lf Ackimce α  9 9 icf{α ;, α =, . . ., α f }, doeks mkhwk α  6 6 2. Ik`k M( x 9 ;, =, …, f x , α  ) ⊍ M( x x , α  )c ⊍ Lc , c  9 f

ykfg mork`cmkt mkhwk M( x , α ) ⊍ ∣ Lc . Dkac tormu`tc mkhwk c 9;

f

∣L

c

tormu`k

c 9;

 @lfvors akrc prlplscsc ac ktks acmorc`kf pkak prlplscsc somkgkc morcùt =8

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

Rrlplscscsc 4 ôtckp hcipufkf tormu`k ac  iorupk`kf gkmufgkf torhctufg akrc soekfg-soekfg tormu`k ykfg skecfg kscfg. Mu`tc 4 Icske`kf L somkrkfg hcipufkf tormu`k ac  . @krofk L tormu`k, ik`k uftu` sotckp x ∈ L torakpkt y  6 6 x  soaoic`ckf soaoic`ckf sohcfggk ( x ) ⊍ L. x , y Icske`kf 9 sup { y  | | ( x ) ⊍ L}, akf m  9 x,  y 9 cfj {z  | | ( z ) ⊍ L} k  9 z, x ik`k k 5 x  5 5 m  akf akf C x  9 ( k ) kakekh soekfg tormu`k tormu`k ykfg ioiukt x . k, m @ekci C x ⊍ L. Ackimce somkrkfg w ∈ C x , somut x 5 w 5 m , morakskr`kf aojcfcsc m  ac ac ktks, ik`k acporleoh mcekfgkf y  6 6 w  sohcfggk sohcfggk ( x ) ⊍ L. Dkac w ∈ L. x,  y @ekci m ∃ L. Kfakc`kf m ∈ L, ik`k kak ο  6 6 2 sohcfggk ( m „ ο , m  + + ο  ) ⊍ L ktku ( x + ο  ) ⊍ L. m „ x , m  + @lftrkac`sc aofgkf aojcfcsc m . ônkrk skik akpkt acmu`tc`kf mkhwk k ∃ L. Hcipufkf {C x }, x ∈ L iorupk`kf `leo`sc soekfg-soekfg mu`k. @krofk sotckp x  ac ac L toriukt ac C x  akf sotckp C x  toriukt ac L, acporleoh L 9 ∤ C x .

Icske`kf ( k ) akf ( n ) somkrkfg auk soekfg ac L aofgkf momorkpk tctc` ykfg skik. Ik`k k, m n , a hkrusekh n  5 5 m  akf akf k  5 5 a . @krofk n ∃ L, ik`k n ∃ ( k ). Acporleoh n ≡ k . k, m @krofk k ∃ L, ik`k n ∃ ( n ). Acporleoh k ≡ n . n, a Dkac k  9 9 n . ônkrk skik, acporleoh m  9 9 a . K`cmktfyk ( k ) 9 ( n ). k, m n, a ôhcfggk sotckp auk soekfg ykfg mormoak ac { C x } pkstc skecfg kscfg. Dkac, L iorupk`kf gkmufgkf soekfg-soekfg mu`k ykfg skecfg kscfg. Qork`hcr tcfggke actufdu``kf L torhctufg. ôtckp soekfg mu`k ioiukt mcekfgkf rksclfke 7. @krofk L gkmufgkf soekfg-soekfg mu`k ykfg skecfg kscfg akf sotckp cftorvke mu`k ioiukt mcekfgkf rksclfke ik`k torakpkt `lrosplfaofsc `lrosplfaofsc ;-; kftkrk L aofgkf hcipufkf mcekfgkf rksclfke ktku hcipufkf mkgckffyk. Dkac L torhctufg.

 Rrlplscsc 4 Dc`k N  `leo`sc `leo`sc hcipufkf tormu`k ac  , ik`k

∤ L hcipukf tormu`k ac

.

L∈N

Mu`tc 4 uftu` suktu suktu L ∈ N x ∈ ∤ L ⇑ .x ∈ L , uftu`

L∈N

⇑ .∎α 6 2 ∀ M( x , α ) ⊍ L , uftu` suktu L ∈ N

⇑ .∎α 6 2 ∀ M( x , α ) ⊍ ∤ L L∈N

Dkac,

∤ L hcipufkf tormu`k ac

.

L∈N

Kflthor vorsclf vorsclf (wcth nluftkmeo rovcsclf) rovcsclf) 4 Ackimce somkrkfg x ∈ ∤ L , ik`k torakpkt L ∈ N  sohcfggk sohcfggk x ∈ L. @krofk L tormu`k ik`k L∈N

torakpkt α   6 2 sohcfggk M( x x, α  ) ⊍ L ⊍

∤ L . Dkac tormu`tc mkhwk uftu` sotckp

L∈N

torakpkt α  6 6 2 sohcfggk M( x x, α  ) ⊍

x ∈ ∤L L∈N

∤ L ykfg morkrtc ∤ L tormu`k.

L∈N

L∈N



7 K`sclik

Krnhcioaos =3

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

Roreu acporhktc`kf mkhwk, dc`k N   `leo`sc hcipufkf tormu`k ac  ik`k

∣L

8

moeui toftu

L∈N

⎐ ; ;⎖ hcipufkf tormu`k ac  . ômkgkc nlftlh, Lf 9 ⎕ ∝ , ⎜ soekfg tormu`k, totkpc ⎙ f f ⎢

∖

∣L

f

{2} mu`kf 9 {2}

f 9;

hcipufkf hcfggk ac  . Rrlplscsc (Ecfaoeúj) 4 Icske`kf N  `leo`sc `leo`sc hcipufkf tormu`k ac  , ik`k torakpkt {Lc } sum`leo`sc torhctufg akrc N soaoic`ckf sohcfggk ∖

∤ L 9 ∤L

c

L∈N

c 9;

Mu`tc 4 Icske _ 9 ∤{L |L ∈ N }

Ackimce somkrkfg x ∈ _ . Ik`k torakpkt hcipufkf L ∈ N , aofgkf x ∈ L. @krofk L tormu`k, ik`k torakpkt soekfg mu`k C x   sohcfggk x ∈ C x ⊍ L. Acporleoh3 mkhwk torakpkt soekfg mu`k D x aofgkf tctc` k`hcr mcekfgkf rksclfke sohcfggk x ∈ D x ⊍ C x . @krofk `leo`sc soiuk soekfg mu`k aofgkf tctc` k`hcr mcekfgkf rksclfke kakekh torhctufg, ik`k hcipufkf { D x }, x torhctufg akf _ 9 ∤ D x . ∈ _  torhctufg x ∈_

_ftu` sotckp soekfg ac { D x } pcech hcipufkf L ac N  ykfg ykfg ioiukt D x . Acporleoh sumsot torhctufg ∖

∖

{Lc }c 9; akrc N , akf _ 9 ∤ L 9 ∤ Lc L∈N

c 9;

 =.:.

Hcipufkf Qortutup Rofutup hcipufkf O acfltksc`kf O Aojcfcsc 4 x ∈ O ⇑ ∂α 6 2, ∎y ∈ O ∀| x ∝ y |5 α

Aofgkf `ktk ekcf, x ∈ O , dc`k sotckp soekfg mu`k ykfg ioiukt x  dugk dugk ioiukt suktu tctc` ac O;2. Dkac, doeks O ⊍ O . Nlftlh 4 O 9 (2, ;Y. Qoftu`kf O . Kpk`kh x  9 9 2 ∈ O <

∂α 6 2, ∎ y ∈ O 9 ( 2, ;Y ∀ | x ∝ y |5 α

Rorhktc`kf mkhwk y f 9

; ↝2 f

∂α  6 6 2, ∎f 2 ∈ F , ∀ | y f  „ 2| 5 α , ∂f ≯ f 2 ktku, ∂α  6 6 2, | y f  „ 2| 5 α ; ; Rcech y f 2 9 ∈ (2,;Y . @krofk ↝ 2 , ik`k ∂α  6 6 2, | y f  „ 2| 5 α . ôhcfggk x  9 9 2 ∈ O . f 2

f

Dkac, O 9 P2,;Y . 8 Crcskf

tk` morhcfggk hcipufkf-hcipufkf tormu`k prlplscsc 4 Dc`k x  akf akf y  mcekfgkf mcekfgkf roke akf x  5 5 y  ik`k ik`k torakpkt mcekfgkf rksclfke r  sohcfggk sohcfggk x  5 5 r  5 5 y ;2 |x  „ „ y | 5 α , morkrtc y ∈ ( x „ α , x + α  ). ôhcfggk ∂α  6 6 2, y ∈ ( x „ α , x + α  ). Dkac, sotckp soekfg tormu`k tormu`k ykfg ioiukt x, dugk ioiukt x „ x „ suktu tctc` (ykctu y ) ac O. 3 Echkt

>2

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

Rrlplscsc 4 ;. Dc`k ;. Dc`k K ⊍ M ik`k K ⊍ M

=. K ∤ M 9 K ∤ M Mu`tc 4 ;. Ackimce somkrkfg α 6 2 akf x ∈ K . @krofk x ∈ K , ik`k ∎ y ∈ K ∀ | y  „ „ x | 5 α . @krofk K ⊍ M, ik`k y ∈ M ∀ | y  „ „ x | 5 α . Iofurut aojcfcsc, x ∈ M . Dkac tormu`tc K ⊍ M . =. @krofk K ⊍ K ∤ M, morakskr ;) ac ktks ik`k K ⊍ K ∤ M . Hke ykfg skik, `krofk M ⊍ K ∤ M ik`k M ⊍ K ∤ M . Dkac, K ∤ M ⊍ K ∤ M . @oiuackf, k`kf acmu`tc`kf mkhwk K ∤ M ⊍ K ∤ M . Acscfc acmu`tc`kf `lftrkplscscfyk, ykctu dc`k x ∃ K ∤ M ik`k x ∃ K ∤ M . @krofk x ∃ K ∤ M , ik`k x ∃ K akf x ∃ M . x ∃ K ⇝ ∎α ; 6 2 ∀ tcak` kak y ∈ K aofgkf | x ∝ y |5 α  ; x ∃ M ⇝ ∎α = 6 2 ∀ tcak` kak y ∈ M aofgkf | x ∝ y |5 α  =

Ackimce α  9 9 icf{α ;, α =}, ik`k tcak` kak y ∈ K ∤ M aofgkf | y  „ „ x | 5 α . Dkac, x ∃ K ∤ M . Cfc morkrtc, dc`k x ∃ K ∤ M ik`k x ∃ K ∤ M . Mu`tc ekcf 4 Ackimce somkrkfg α  6 6 2 akf x ∈ K ∤ M . x ∈ K ∤ M ⇝ ∂α 6 2, ∎y ∈ K ∤ M ∀| y ∝ x |5 α @krofk y ∈ K ∤ M, ik`k y ∈ K ktku y ∈ M. _ftu` y ∈ K aofgkf | y  „ „ x | 5 α  acporleoh acporleoh x ∈ K _ftu` y ∈ M aofgkf | y  „ „ x | 5 α  acporleoh acporleoh x ∈ M Dkac, x ∈ K ∤ M .

 Aojcfcsc 4 Hcipufkf J  acsomut acsomut tortutup ( nelsoa ) dc`k J 9 J nelsoa

Iofurut aojcfcsc J ⊍ J , ik`k hcipufkf J acsomut tortutup dc`k J ⊍ J , ykctu dc`k J ioiukt soiuk tctc`-tctc` neustorfyk. Nlftlh 4 ;) J  9 9 (2, ;Y mu`kf hcipufkf tortutup, somkm J 9 P2,;Y ≢ J

=) >) 1) ?)

9 P2, ;Y hcipufkf tortutup, somkm J 9 P2,;Y 9 J J  9 ôekfg P k Y akf P;, ∖ Y kakekh hcipufkf hcipufkf tortutup k, m  kakekh hcipufkf tortutup 9 ∏. K`kf acmu`tc`kf mkhwk ∏ 9 ∏ J  9 Mu`tc 4 Akrc aojcfcsc, ∏ ⊍ ∏ . Dkac, tcfggke acmu`tc`kf ∏ ⊍ ∏ . x ∈ ∏ ⇑ .∂α 6 2, ∎y ∈ ∏, ∀| y ∝ x |5 α

⇑ .∂α 6 2, ∎ y ∈ ∏, ∀ y ∈ M( x , α ) ⇑ .x ∈ ∏ Dkac, ∏ ⊍ ∏ . Leoh `krofk ctu tormu`tc mkhwk ∏ ⊍ ∏ .  Rrlplscsc 4 Rofutup hcipufkf O kakekh tortutup. >;

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

Mu`tc 4 K`kf acmu`tc`kf O 9 O . Akrc aojcfcsc, O ⊍ O . Dkac, tcfggke acmu`tc`kf O ⊍ O . Icske`kf x ∈ O . x ∈ O ⇑ ∂α 6 2, ∎y ∈ O , ∀| y ∝ x |5 α

= @krofk y ∈ O ik`k uftu` α  ac ac ktks, torakpkt z ∈ O so sohcfggk |z ∝ y |5 α = .

Dkac, uftu` α  ac ac ktks, torakpkt z ∈ O sohcfggk |z ∝ x |. 9|z ∝ y + y ∝ x | . 5|z ∝ y | +| y ∝ x | . 5 α = + α = 9 α Cfc morkrtc x ∈ O

 Rrlplscsc 4 Dc`k J ; akf J = tortutup, ik`k J ; ∤ J = tortutup. Mu`tc 4

K`kf acmu`tc`kf acmu`tc`kf mkhwk J; ∤ J= 9 J; ∤ J= . Akrc aojcfcsc, doeks mkhwk J; ∤ J= ⊍ J; ∤ J= sohcfggk nuùp acmu`tc`kf J; ∤ J= ⊍ J; ∤ J= Ackimce somkrkfg x ∈ J; ∤ J = . K`kf acmu`tc`kf mkhwk x ∈ J; ∤ J = . Iofurut prlplscsc somoeuifyk, x ∈ J; ∤ J= 9 J; ∤ J= . @krofk J ; akf J = tortutup, ik`k x ∈ J; ∤ J = .

 Rrlplscsc 4 Crcskf `leo`sc hcipufkf tortutup kakekh tortutup Mu`tc 4 Icske`kf N `leo` leo`ssc hcipu cipufk fkff-hc hci ipufkf ufkf tor tortutu utup. K` K`kf kf acm acmu`tc u`tc``kf mkh mkhwk

∣{J | J ∈ N }

∣{J | J ∈ N } 9 ∣{J | J ∈ N } . Iofurut aojcfcsc, nuùp acmu`tc`kf ∣{J | J ∈ N } ⊍ ∣{J | J ∈ N } . Ackimce somkrkfg x ∈ ∣{J | J ∈ N } . Ik`k uftu` sotckp α 6 2 torakpkt y ∈ ∣{J | J ∈ N }

tortutup, ykctu

sohcfggk | y  „ „ x | 5 α . @krofk ∈ ∣{J | J ∈ N } ik`k y ∈ J  uftu` uftu` sotckp J ∈ N  aofgkf aofgkf | y „ x | 5 α . Iofurut aojcfcsc, acporleoh mkhwk x ∈ J  uftu` sotckp J ∈ N . @krofk J ∈ N  ik`k ik`k J  tortutup. tortutup. @krofk J  tortutup tortutup ik`k J 9 J k`cmktfyk x ∈ J , uftu` sotckp J ∈ N . Akrc scfc ik`k, x ∈ ∣{J | J ∈ N } . Dkac tormu`tc mkhwk

∣{J | J ∈ N } ⊍ ∣{J | J ∈ N } . ôhcfggk ∣{J | J ∈ N } tortutup. 

Rrlplscsc 4 ;. @lipeoiof hcipufkf tormu`k kakekh tortutup =. @lipeoiof hcipufkf tortutup kakekh tormu`k Mu`tc 4

;. Icske`kf L hcipufkf tormu`k. K`kf acmu`tc`kf mkhwk L n 9 L n . Akrc aojcfcsc L n ⊍ L n . Dkac nuùp acmu`tc`kf acmu`tc`kf L n ⊍ L n . K`kf acmu`tc`kf `lftrkplscscfyk. `lftrkplscscfyk. @krofk L tormu`k, ik`k ∂x ∈ L, ∎α  6 6 2 sohcfggk M( x x , α  ) ⊍ L. @krofk x ∈ L, ik`k x ∃ Ln . Icske`kf y ∈ M( x x, α  ). @krofk M( x x, α  ) ⊍ L ik`k y ∈ L. >=

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

ôhcfggk, dc`k | y  „ „ x | 5 α  ik`k ik`k y ∈ L. Krtcfyk, tcak` kak y ∈ Ln  sohcfggk | y  „ „ x | 5 α . ôsukc aojcfcsc pofutup, x ∃ L n =. Icske`kf J  hcipufkf hcipufkf tortutup. K`kf acmu`tc`kf mkhwk J n  tormu`k. Ackimce somkrkfg x ∈ J n , k`kf acmu`tc`kf mkhwk torakpkt α  6 6 2 sohcfggk M( x x , α  ) ⊍ J n . Dc`k α  6 6 2 ackimce soimkrkfg, ik`k nuùp acmu`tc`kf M( x x , α  ) ⊍ J n . K`kf acmu`tc`kf `lftrkplscscfyk. @krofk x ∈ J n   ik`k x ∃ J . @krofk J   tortutup, ik`k x ∃ J 9 J . Krtcfyk, tcak` kak 6 2 ykfg acmorc`kf morekù | y  „ „ x | 5 α . ôhcfggk, uftu` y ∈ J  sohcfggk uftu` sotckp α  6 sotckp y ∈ J  morekù morekù y ∃ M( x sotckp y ∃ J n  ik`k y ∃ M( x x, α  ). Dkac, uftu` sotckp x , α  ).  @leo`sc hcipufkf N  acsomut acsomut soeciut ( nlvors ) akrc hcipufkf hcipufkf J  dc`k dc`k nlvors J ⊍ ∤{L 4 L ∈ N } akeki hke cfc `leo`sc hcipufkf N   acsomut iofyoeciutc ( nlvorcfg ) J . Dc`k sotckp L ∈ N   tormu`k, ik`k nlvorcfg `leo`sc N   acsomut soeciut tormu`k ( lpof ) akrc J . Dc`k N   hkfyk ioiukt soduiekh morhcfggk lpof nlvorcfg hcipufkf-hcipufkf, hcipufkf-hcipufkf, ik`k `leo`sc N  acsomut acsomut soeciut hcfggk ( ). Akeki hke ‘soeciut tormu`k–, jcfcto nlvorcfg `ktk scjkt ‘tormu`k– torsomut iofufdu``kf scjkt hcipufkf-hcipufkf akeki soeciut akf tcak` morik`fk ‘acsoeciutc leoh hcipufkf tormu`k–. Aoic`ckf dugk aofgkf cstcekh ‘soeciut hcfggk– tcak` iofufdu``kf mkhwk soeciutfyk iorupk`kf hcipufkf morhcfggk. Qolroik (Hocfo-Mlroe) (Hocfo-Mlroe) 4 Icske`kf J  tortutup tortutup akf tormktks pkak  . Ik`k sotckp soeciut tormu`k akrc J  ioipufykc ioipufykc soeciut mkgckf ykfg morhcfggk. Aofgkf `ktk ekcf, dc`k N kakekh `leo`sc hcipufkf tormu`k sohcfggk J ⊍ ∤{L 4 L ∈ N } f

ik`k kak `leo`sc morhcfggk { L;, L=, . . ., Lf } pkak N  sohcfggk sohcfggk J ⊍ ∤ Lc . c 9;

Mu`tc 4 (soo ‘]oke Kfkeyscs–, >ra oa., H.E. ]lyaof, pkgo 1?) =.7.

Jufgsc @lftcfu Icske`kf j jufgsc morfcekc roke aofgkf alikcf O iorupk`kf hcipufkf mcekfgkf roke. Morcùt cfc aojcfcsc-aojcfcsc aojcfcsc-aojcfcsc `lftcfu ac tctc`, `lftcfu pkak O, akf `lftcfu sorkgki pkak O;;. Aojcfcsc 4 Jufgsc j  ac`ktk`kf ac`ktk`kf `lftcfu ac tctc` ( nlftcfulus ) x ∈ O dc`k ∂ο  6 6 2, ∎α  6 6 2 sohcfggk ∂ y nlftcfulus kt tho plcft „ x | 5 α  ik`k ik`k | j ( (x   ) „ j ( ( y   )| 5 ο . ∈ O, aofgkf | y  „ x Jufgsc j  ac`ktk`kf ac`ktk`kf `lftcfu pkak ( nlftculus ) K sumsot akrc O dc`k j  `lftcfu `lftcfu ac sotckp tctc` akrc K. nlftculus lf Jufgsc j  ac`ktk`kf ac`ktk`kf `lftcfu sorkgki pkak ( ufcjlriey ) O, dc`k ∂ο  6 6 2, ∎α  6 6 2 sohcfggk ufcjlriey nlftcfulus lf „ x | 5 α  ik`k ik`k | j ( ( x ( y   )| 5 ο . ∂x , y ∈ O, aofgkf | y  „ x ) „ j (

_ftu` soekfdutfyk, dc`k acsomut`kf j   `lftcfu, ik`k ykfg acik`sua kakekh j   `lftcfu pkak alikcffyk. Rrlplscsc 4 Icske`kf j   jufgsc morfcekc roke ykfg `lftcfu akf acaojcfcsc`kf pkak J . Dc`k J   `lftcfu akf tormktks, ik`k j  tormktks tormktks pkak J  akf akf ioipufykc tctc` ik`sciui akf icfciui pkak J . Krtcfyk kak tctc` x ; akf x = ac akeki J  sohcfggk sohcfggk j ( (x ;  ) ≡ j ( ( x (x = ), ∂x ∈ J . x x ) ≡ j ( x Mu`tc 4 ;; Roimoakkf

x,  y , ktku α  ) cfc hkfyk torechkt akrc mkgkcikfk òtorgkftufgkf poicechkf α  torhkakp torhkakp ykfg ekcf ( x >>

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c

(soo ‘]oke Kfkeyscs–, >ra oa., H.E. ]lyaof, pkgo 17) Rrlplscsc 4 Icske`kf j   jufgsc morfcekc roke ykfg acaojcfcsc`kf pkak  . Jufgsc j   `lftcfu pkak  dc`k akf hkfyk dc`k j  „;( L ) tormu`k uftu` sotckp L hcipufkf tormu`k ac  . Mu`tc 4 (soo ‘]oke Kfkeyscs–, >ra oa., H.E. ]lyaof, pkgo 17„18) Qolroik (Qolroik Fcekc Kftkrk) 4 Icske`kf j  jufgsc jufgsc morfcekc roke akf `lftcfu pkak P k Y. Dc`k j ( (k ( y   ) ≡ j ( ( m (m ( y   ) ≡ j ( (k k, m k  ) ≡ j ( m ) ktku j ( m  ) ≡ j ( k  ) ik`k kak n ∈ P k Y soaoic`ckf sohcfggk sohcfggk j ( (n k, m n  ) 9 y . Rrlplscsc 4 Dc`k j  jufgsc jufgsc morfcekc roke akf `lftcfu pkak hcipufkf tortutup akf tormktks J  ik`k ik`k j   `lftcfu sorkgki pkak J . Mu`tc 4 (soo ‘]oke Kfkeyscs–, >ra oa., H.E. ]lyaof, pkgo 18) Aojcfcsc 4 Icske`kf 5 j f 6 mkrcskf jufgsc pkak O. Mkrcskf 5 j f 6 ac`ktk`kf `lfvorgof tctc` aoic tctc` ( nlfvorgo nlfvorgo ;= ) pkak O ò jufgsc j , dc`k ∂x ∈ O akf ο  6 6 2, ∎ F sohcfggk | j ( (x   ) „ j f ( x plcftwcso x x )| 5 ο, ∂f ≯ F . Mkrcskf 5 j f 6 ac`ktk`kf `lfvorgof sorkgki ( nlfvorgo ) pkak O ò jufgsc j , dc`k ∂ο   6 2, nlfvorgo ufcjlriey ;> (x   ) „ j f ( x ∎ F sohcfggk ∂x ∈ O, | j ( x x )| 5 ο , ∂f ≯ F . =.8.

Hcipufkf Mlroe Wkekupuf crcskf akrc somkrkfg `leo`sc hcipufkf tortutup kakekh tortutup akf gkmufgkf akrc `leo`sc morhcfggk akrc hcipufkf tortutup dugk tortutup, totkpc gkmufgkf akrc `leo`sc torhctufg hcipufkf-hcipufkf hcipufkf-hcipufkf tortutup tcak` hkrus tortutup. ômkgkc nlftlh, hcipufkf mcekfgkf rksclfke kakekh gkmufgkf akrc `leo`sc torhctufg hcipufkfhcipufkf tortutup ykfg sotckp hcipufkffyk ioiukt topkt sktu kfggltk. Aojcfcsc 4 @leo`sc hcipufkf Mlroe M kakekh kedkmkr-ώ torònce ykfg ioiukt soiuk hcipufkf-hcipufkf tormu`k.

O`scstofsc kedkmkr-ώ cfc acdkicf leoh prlplscsc ;1 > ac Mkm C. Eomch ekfdut, kedkmkr-ώ torònce cfc dugk ioiukt soiuk hcipufkf-hcipufkf tortutup akf ioiukt puek soiuk soekfg-soekfg mu`k. Hcipufkf ykfg iorupk`kf gkmufgkf torhctufg akrc hcipufkf-hcipufkf tortutup acsomut J ώ ktku ac`ktk`kf ioicec`c tcpo J ώ ( J ac`ktk`kf J uftu` uftu` tortutup, ώ uftu` duiekh). ôhcfggk, hcipufkf A  ac`ktk`kf ∖

ioicec`c tcpo J ώ dc`k akpkt actuecs A 9 ∤ J f uftu` sotckp hcipufkf tortutup J f  ac ] . f 9;

Dc`k J  hcipufkf hcipufkf tortutup, ik`k J  ioicec`c ioicec`c tcpo J ώ somkm J  akpkt akpkt actuecs iofdkac ∖

J 9 ∤ J f f 9;

aofgkf J ; 9 J 0 J = 9 J > 9 J 1 9 . . . 9 ∏ ykfg iorupk`kf hcipufkf tutup. Dugk, soekfg mu`k ( k , m ) ioicec`c tcpo J ώ, somkm

;= Roicechkffyk

morgkftufg pkak x tcak` morgkftufg pkak x ;1 Rrlplscsc 4 Icske`kf N `leo`sc hcipufkf mkgckf akrc X , ik`k torakpkt kedkmkr- ώ torònce ]  ykfg ykfg ioiukt N. ;> Roicechkffyk

>1

Mkm = „ ^cstoi Mcekfgkf ]oke

Nlipceoa my 4 @hkorlfc, ^.^c ∖

;⎡ ⎫ ; ( k , m ) 9 ∤ ⎭ k + , m ∝ ⎯ f f ⎪ f 9; ⎮ Akrc scfc acporleoh mkhwk sotckp hcipufkf tormu`k ioicec`c tcpo J ώ. ômkm, dc`k L mu`k ik`k 4 ∖ ;⎡ ⎫ ; L 9 ∤ ⎭k + , m ∝ ⎯ f f ⎪ f 9; ⎮ Aofgkf k 9 mktks mkwkh L, akf m 9 mktks ktks L. Crcskf torhctufg akrc soiuk hcipufkf tormu`k ac`ktk`kf ioicec`c tcpo Gα. Dkac, suktu hcipufkf ac`ktk`kf ioicec`c tcpo Gα dc`k hcipufkf torsomut iorupk`kf crcskf torhctufg akrc soiuk hcipufkf tormu`k. Dkac, `lipeoiof akrc hcipufkf ykfg ioicec`c tcpo J ώ kakekh hcipufkf ykfg ioicec`c tcpo Gα akf aoic`ckf dugk somkec`fyk. ômkm, n

∖

n

∖ ⎐ ⎖ ⎐∖ ⎖ n Jώ 9 ∤ Jf ⇝ ⎕ Jώ 9 ∤ Jf ⎜ ⇑ ( Jώ ) . 9 ⎕ ∤ Jf ⎜ f 9; f 9; ⎙ ⎢ ⎙ f 9; ⎢ ∖

. 9 ∣ J f n f 9;

@krofk J f   tortutup uftu` sotckp J f ac  ik`k iofurut prlplscsc, J f n   tormu`k. Qorechkt ( J Jώ  )n iorupk`kf crcskf torhctufg akrc hcipufkf-hcipufkf tormu`k. Dkac tormu`tc mkhwk ( J ώ )n  ioicec`c tcpo Gα. Mu`tc somkec`fyk kfkelg. Hcipufkf ykfg ioicec`c tcpo J ώ akf Gα kakekh nlftlh hcipufkf Mlroe, ykctu kedkmkr-ώ torònce ykfg ioiukt soiuk hcipufkf tormu`k akf tortutup.

>?

Mkm > _ùrkf Eomosguo >.;.

Rofakhueukf Rkfdkfg e ( ( C acaojcfcsc`kf somkgkc soecsch kftkrk òauk tctc` udufgfyk ykfg hkscefyk C ) akrc cftorvke C  acaojcfcsc`kf morupk mcekfgkf roke. Rkfdkfg soekfg kakekh skekh sktu nlftlh jufgsc hcipufkf. Jufgsc hcipufkf kakekh suktu jufgsc ykfg ioiotk`kf kftkrk mcekfgkf roke ykfg ac poreuks  * aofgkf sotckp hcipufkf ac akeki suktu `leo`sc hcipufkf-hcipufkf. Akeki hke cfc, alikcf akrc jufgsc-fyk kakekh `leo`sc soiuk cftorvke-cftorvke (soekfg). @ctk hofak` ioiporeuks `lfsop pkfdkfg cfc iofdkac tcak` hkfyk pkak cftorvke ioekcf`kf hcipufkf ykfg nuùp ruict. ônkrk soaorhkfk, `ctk akpkt iofaojcfcsc`kf ‘pkfdkfg– akrc suktu hcipufkf tormu`k somkgkc duiekhkf pkfdkfg akrc soekfg-soekfg tormu`k ykfg iofyusuf hcipufkf tormu`k torsomut. @krofk òeks akrc hcipufkf tormu`k iksch torekeu ruict, `ctk k`kf iofg`lfstru`sc jufgsc hcipufkf i ykfg ioiotk`kf sotckp hcipufkf O ac akeki suktu `leo`sc hcipufkf mcekfgkf roke I ykfg acporeuks aofgkf suktu mcekfgkf roke acporeuks ykfg tk` fogktcj i ( ( O ). Jufgsc i cfc acsomut uùrkf akrc hcipufkf O ( ioksuro lj achkrkp`kf kakekh kgkr i ioiofuhc scjkt-scjkt scjkt-scjkt morcùt4 ioksuro lj  O O ). Qudukf ykfg achkrkp`kf c. i ( ( O ) toraojcfcsc uftu` uftu` sotckp hcipufkf hcipufkf mcekfgkf roke O, ykctu I 9 ℘(  ). cc. i ( ( C (C C ) 9 e ( C  ), uftu` sotckp soekfg C

ccc. Dc`k 5 Of 6 mkrcskf hcipufkf skecfg eopks akf i ( ( O ) f toraojcfcsc, i ( ∤ Of ) 9

∛ i( O ) f

cv. i  iorupk`kf iorupk`kf jufgsc trkfseksc cfvkrckft, ykctu dc`k O hcipufkf acikfk i  toraojcfcsc toraojcfcsc akf dc`k 9 {x  + + y  | | x ∈ O}, acporleoh aofgkf iofggkftc sotckp tctc` ac O aofgkf x  + + y  4 4 O + y  9 ( O + y ) 9 i ( ( O ) i ( ^kykfgfyk, tcak` iufg`cf uftu` ioimukt somukh jufgsc hcipufkf ykfg ioicec`c òoipkt scjkt ac ktks, akf dugk tcak` acòtkhuc kpk`kh kak jufgsc hcipufkf ykfg ioiofuhc tcgk scjkt ykfg portkik. ômkgkc k`cmktfyk, skekh sktu akrc scjkt-scjkt ac ktks hkrus actckak`kf. K`kf eomch iuakh dc`k iofckak`kf scjkt ykfg portkik akf iofgkimce òtcgk scjkt ykfg ekcf. ôhcfggk i ( ( O ) tcak` poreu toraojcfcsc uftu` soiuk hcipufkf mcekfgkf roke O, nuùp hkfyk momorkpk skdk. Qoftu skdk, `ctk cfgcf kgkr i ( ( O ) toraojcfcsc uftu` somkfyk`-mkfyk`fyk hcipufkf ykfg iufg`cf. @ctk k`kf ioicech I, ykctu `leo`sc ( ) hcipufkf acikfk i   toraojcfcsc, ykfg iorupk`kf kedkmkr- ώ. Ik`k uùrkf i   ykfg jkicey acporleoh acsomut uùrkf kactcj ykfg torhctufg ( nluftkmey ), dc`k i   iorupk`kf jufgsc nluftkmey kaactcvo ioksuro morfcekc roke tk` fogktcj ykfg aojcfcsc alikcffyk iorupk`kf kedkmkr- ώ I (hcipufkf mcekfgkf roke) akf morekù4 i ( ∤ Of ) 9 i( Of )

∛

uftu` sotckp 5 Of 6 mkrcskf hcipufkf skecfg eopks ac I. Qudukf `ctk akeki sum-mkm morcùtfyk kakekh k`kf iofg`lfstru`sc somukh uùrkf kactcj torhctufg ykfg trkfseksc cfvkrckft akf ioicec`c scjkt (C ( C i ( C  ) 9 e ( C ) uftu` sotckp soekfg C . >.=.

_ùrkf Eukr _ftu` sotckp hcipufkf mcekfgkf roke K, pkfakfg `leo`sc torhctufg soekfg-soekfg mu`k { C f } ykfg iofyoeciutc K. Skctu, `leo`sc ykfg ioiofuhc K ⊍ ∤ C f Nlftlh4 K 9 (2,;Y

Mkm > „ _ùrkf Eomosguo

;.

Nlipceoa my 4 @hkorlfc, ^.^c

⎐ ; ⎖ ⎐> ⎖ {C ; , C = } , C ; 9 ⎕ ∝ , ;⎜ , C = 9 ⎕ , = ⎜ ⎙ = ⎢ ⎙1 ⎢ {C ; , C = } soeciut mu`k. K ⊍ C ; ∤ C =

=.

e ( C ; ) + e ( C = ) 9 =

> 1

⎐ ;⎖ {C ;} , C ; 9 ⎕ 2, ; ⎜ ⎙ =⎢ {C ;} soeciut mu`k. K ⊍ C ;

e ( C ; ) 9 ;

; =

 Akf uftu` sotckp `leo`sc, pkfakfg duiekhkf pkfdkfg ikscfg-ikscfg soekfg ac akeki `leo`sc torsomut. @krofk pkfdkfg kakekh mcekfgkf plsctcj, ik`k duiekhkf torsomut acaojcfcsc`kf sonkrk tufggke akf cfaopofaof akrc urutkf mkrcskffyk. Icske`kf J   `leo`sc soeciut mu`k K. Acaojcfcsc`kf uùrkf eukr ( lutor ) i *( *( lutor ioksuro K ) akrc K somkgkc cfjciui akrc soiuk duiekhkf-duiekhkf duiekhkf-duiekhkf torsomut. Acfltksc`kf somkgkc i * ( K ) 9 cfj e ( C f ) 9 cfj e ( C f ) K ⊍

∤ C f

∛

{C f }∈J

∛

K`cmkt 4 ;. i *( *( ∏   ∏ )   9 2 =. dc`k K ⊍ M ik`k i *( *( *( M ) K ) ≡ i *( >. i *({ *({k }) }) 9 2, ∂ k ∈ ] Mu`tc 4 ∏ )   ≯ 2. ;. Qorechkt ekfgsufg akrc aojcfcsc mkhwk i *( *( ∏   =ο ⎐ ο ο ⎖ Kimce somkrkfg ο 6 2. Rcech C f 9 ⎕ ∝ , ⎜ . Akrc scfc ik`k e ( C f ) 9 9 ο akf C f = ⎙ = =⎢ iorupk`kf soeciut mu`k uftu` ∏  . Dkac, ∏ ⊍ C f ⇑ i * ( ∏ ) ≡ e ( C f ) 9 ο . ôhcfggk, i * ( ∏ ) ≡ ο , ∂ο 6 2 ⇝ i * ( ∏ ) 9 2

=. Ackimce J K

9 {{C f } 4 {C f } soeciut mu`k uftu` K}

JM

9 {{C f } 4 {C f } soeciut mu`k uftu` M}

akf @krofk K ⊍ M ⊍ ∤ C f , ik`k morekù soeciut M dugk mcsk acpk`kc somkgkc soeciut uftu` K ). {C f } ∈ JM ⇝ {C f } ∈ J K (sotckp Dkac, JM ⊍ J K . K`cmktfyk, cfj J K ≡ cfj J M Mogctu dugk aofgkf duiekhkffyk. Iofurut aojcfcsc, i *( *( *( M ) K ) ≡ i *( >. Ackimce somkrkfg k ∈ ] , ο  6 6 2 akf J{k } 9 {{C f } 4 {C f } soeciut mu`k uftu` {k}} ik`k, i * ({k}) 9 cfj

{ C f }∈J { k }

∛ e ( C ) ≡ ο = 5 ο f

@krofk ο  6 6 2 somkrkfg ik`k i *({ *({k }) }) 9 2.

 >7

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

Rrlplscsc 4 _ùrkf eukr akrc suktu soekfg skik s kik aofgkf pkfdkfg soekfg torsomut. ômkgkc nlftlh, dc`k K 9 P2,=Y ik`k i *( *( K ) 9 =. Mu`tc 4 Y @ksus ; 4 Icske`kf P k k, m ( Zorsc Zorsc Ir. ]lyaof  ) @krofk P k Y ⊍ ( k „ ο , m  + + ο  ), ∂ο  6 6 2 ik`k k, m k „ *(P k Y) ≡ e (( (( k „ ο , m  + + ο  )) 9 m  „ „ k  + + =ο i *(P k, m k „ @krofk i *(P *(P k Y) ≡ m  „ „ k  + + =ο , ∂ο  6 6 2 ik`k k , m *(P k Y) ≡ m  „ „ k i *(P k, m ôekfdutfyk, k`kf acmu`tc`kf i *(P *(P k Y) ≯ m  „ „ k . k, m Hke cfc skik skdk aofgkf ioimu`tc`kf mkhwk dc`k { C f } soimkrkfg `leo`sc torhctufg akrc soekfg mu`k ykfg iofyoeciutc P k Y ik`k k, m e ( C f ) ≯ m ∝ k

∛ f

ômkm, cfj K ⊍

∤

C f

@krofk fk cfjc cfjciu iui, i, ik`k ik`k ∛ e ( C ) ≯ m ∝ k . ∛ e ( C ) ≯ m ∝ k . @kro f

f

f

Aofgkf Qolroik Hocfo-Mlroe, sotckp `leo`sc soekfg tormu`k ykfg iofyoeciutc P k , m Y ioiukt sum`leo`sc morhcfggk ykfg dugk iofyoeciutc P k Y, akf `krofk duiekhkf pkfdkfg soekfg akrc k, m sum`leo`sc morhcfggk tcak` eomch moskr akrc duiekhkf pkfdkfg soekfg akrc `leo`sc ksecfyk, ik`k portcak`skikkf ac ktks tormu`tc uftu` `leo`sc morhcfggk { C f } ykfg iofyoeciutc P k Y. k, m @krofk k   toriukt ac akeki ∤ C f ik`k kak ` sohcfggk C ` ioiukt k . Icske`kf C ` 9 ( k k; , m ; ). Acporleoh 5 m ; k ; 5 k  5 Dc`k m ; ≡ m , ik`k m ; ∈ P k Y akf `krofk m ; ∃ ( k k, m k; , m ; ) ik`k torakpkt cftorvke ( k k= , m = ) ac akeki { C f } soaoic`ckf sohcfggk m ; ∈ ( k k= , m = ). Dkac, k = 5 m ; 5 m =. Aoic`ckf sotorusfyk, sohcfggk acporleoh mkrcskf ( k k; , m ; ), ( k k= , m = ), . . ., ( k k` , m ` ) Akrc `leo`sc {C f } soaoic`ckf sohcfggk k c  5 m c  „ „ ; 5 m c . @krofk {C f } `leo`sc morhcfggk, prlsos ac ktks pkstc morhoftc pkak suktu cftorvke ( k k` , m ` ). Qotkpc prlsos cfc hkfyk k`kf morhoftc dc`k m ∈ ( k 5 m `. @krofk k c  5 m c  „ „ ;, ik`k k` , m ` ), ykctu dc`k k ` 5 m  5 e (Cf ) ≯ e ( k c , m c )

∛

∛

9 ( m` ∝ k ` ) + (m` ∝; ∝ k ` ∝; ) +  + (m; ∝ k ; ) 9 m` ∝ ( k ` ∝ m` ∝; ) ∝ ( k ` ∝; ∝ m ` ∝= ) ∝  ∝ ( k = ∝ m; ) ∝ k ; 6 m ` ∝ k ; Qotkpc m ` 6 m  akf akf k ; 5 k . K`cmktfyk, m ` „ k ; 6 m  „ „ k . Dkac, ∛ e ( C f ) 6 m ∝ k . Qormu`tc mkhwk i *(P *(P k Y) ≯ m  „ „ k k, m ( Zorsc ) Zorsc Irs. Kfggc @krofk P k Y ⊍ ( k „ ο , m  + + ο  ), ∂ο  6 6 2 ik`k k, m k „ *(P k Y) ≡ e (( (( k „ ο , m  + + ο  )) 9 m  „ „ k  + + =ο i *(P k, m k „ @krofk i *(P *(P k Y) ≡ m  „ „ k  + + =ο , ∂ο  6 6 2 ik`k k , m *(P k Y) ≡ m  „ „ k i *(P k, m ôekfdutfyk, k`kf acmu`tc`kf i *(P *(P k Y) ≯ m  „ „ k . k, m Hke cfc skik skdk aofgkf ioimu`tc`kf mkhwk dc`k { C f } soimkrkfg `leo`sc torhctufg akrc soekfg mu`k ykfg iofyoeciutc P k Y ik`k k, m e ( C f ) ≯ m ∝ k

∛ f

ômkm, cfj K ⊍

∤ C f

@krofk fk cfjc cfjciu iui, i, ik`k ik`k ∛ e ( C ) ≯ m ∝ k . ∛ e ( C ) ≯ m ∝ k . @kro f

f

f

Aofgkf Qolroik Hocfo-Mlroe, sotckp `leo`sc soekfg tormu`k ykfg iofyoeciutc P k , m Y ioiukt >8

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

sum`leo`sc morhcfggk ykfg dugk iofyoeciutc P k Y, akf `krofk duiekhkf pkfdkfg soekfg akrc k, m sum`leo`sc morhcfggk tcak` eomch moskr akrc duiekhkf pkfdkfg soekfg akrc `leo`sc ksecfyk, ik`k portcak`skikkf ac ktks tormu`tc uftu` `leo`sc morhcfggk { C f } ykfg iofyoeciutc P k Y. k, m @krofk k   toriukt ac akeki ∤ C f ik`k kak ` sohcfggk C ` ioiukt k . Icske`kf C ` 9 ( k k; , m ; ). Acporleoh 5 m ; k ; 5 k  5 Dc`k m ; ≡ m , ik`k m ; ∈ P k Y akf `krofk m ; ∃ ( k k, m k; , m ; ) ik`k torakpkt cftorvke ( k k= , m = ) ac akeki { C f } soaoic`ckf sohcfggk m ; ∈ ( k k= , m = ). Dkac, k = 5 m ; 5 m =. Aoic`ckf sotorusfyk, sohcfggk acporleoh mkrcskf ( k k; , m ; ), ( k k= , m = ), . . ., ( k k` , m ` ) Akrc `leo`sc {C f } soaoic`ckf sohcfggk k c  5 m c  „ „ ; 5 m c . @krofk {C f } `leo`sc morhcfggk, prlsos ac ktks pkstc morhoftc pkak suktu cftorvke ( k k` , m ` ). Qotkpc prlsos cfc hkfyk k`kf morhoftc dc`k m ∈ ( k 5 m `. @krofk k c  5 m c  „ „ ;, ik`k k` , m ` ), ykctu dc`k k ` 5 m  5 e (Cf ) ≯ e ( k c , m c )

∛

∛

9 ( m` ∝ k ` ) + (m` ∝; ∝ k ` ∝; ) +  + (m; ∝ k ; ) 9 m` ∝ ( k ` ∝ m` ∝; ) ∝ ( k ` ∝; ∝ m ` ∝= ) ∝  ∝ ( k = ∝ m; ) ∝ k ; 6 m ` ∝ k ; Qotkpc m ` 6 m  akf akf k ; 5 k . K`cmktfyk, m ` „ k ; 6 m  „ „ k . Dkac, ∛ e ( C f ) 6 m ∝ k . Qormu`tc mkhwk i *(P *(P k Y) ≯ m  „ „ k k, m @ksus = 4 Icske`kf C   soekfg morhcfggk somkrkfg, ik`k uftu` ο   6 2 ykfg acmorc`kf, torakpkt soekfg tortutup D ⊍ C  sohcfggk sohcfggk ( D   ) 6 e ( ( C e ( C ) „ ο Acporleoh, (C 5 e ( ( D   ) 9 i *( *( ) ≡ i *( *( C e ( C  ) „ ο  5 D C ) ≡ i * ( C ) 9 e ( C ) 9 e ( C )

ôhcfggk uftu` sotckp ο  6 6 2, ( C 5 i *( *( C ( C e ( C ) „ ο  5 C ) ≡ e ( C ) Dkac, i *( *( C ( C C ) 9 e ( C ). @ksus > 4 Icske`kf C   cftorvke tk` hcfggk, ik`k uftu` sotckp mcekfgkf roke torakpkt soekfg tortutup D ⊍ C  sohcfggk sohcfggk e ( ( D   ) 9 ∊. Acporleoh *( C *( ) 9 e ( ( D   ) 9 ∊ i *( C ) ≯ i *( D @krofk i *( *( C *( C ( C C ) ≯ ∊ uftu` sotckp ∊, ik`k i *( C ) 9 ∖ 9 e ( C ).

∊ ykfg acmorc`kf

 Rrlplscsc 4 Icske`kf { Kf } `leo`sc torhctufg pkak  , ik`k i * ( ∤ Kf ) ≡

∛i *( K ) f

Mu`tc 4 Dc`k skekh sktu hcipufkf Kf  ioicec`c uùrkf eukr tk` hcfggk ( ∖ ), ik`k ò-tk`skikkf ac ktks acpofuhc. Icske`kf i *( *( K ) f morhcfggk, ik`k torakpkt `leo`sc torhctufg akrc soekfg mu`k { C f,c }c sohcfggk Kf ⊍ ∤ C f ,c c

Dugk, uftu` sotckp ο  6 6 2 morekù

∛ e (C

f ,c

) 5 i * ( Kf ) + = ∝f ο

c

ôekfdutfyk, `krofk `leo`sc

{C , } , 9 ∤{C , } f c

f c

fc

f

>3

c

  torhctufg, iorupk`kf gkmufgkf torhctufg akrc

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

`leo`sc torhctufg, akf iofyoeciutc i*

(∤ K ) ≡ ∛ e (C f

f, c

f ,c

)9

∤ Kf , ik`k

∛ ∛e (C f

f,c

)5

c

@krofk ο  6 6 2 somkrkfg, ik`k i * ( ∤ Kf ) ≡

∛ ( i * ( K ) + = ο ) 9 ∛ i * ( K ) + ο ∝;

f

f

f

∛i *( K ) f

 K`cmkt 4 Dc`k K torhctufg, i *( *( K ) 9 2 (echkt tutlrcke #:) K`cmkt 4 Hcipufkf P2, ;Y tcak` torhctufg Mu`tc 4 @krofk i *(P2,;Y) *(P2,;Y) 9 ; ≢ 2 ik`k P2,;Y tcak` torhctufg.

 Rrlplscsc 4 Dc`k O ⊍  akf y ∈  . Acaojcfcsc`kf O + y

9 {x + y 4 x ∈ O}

ik`k, i *( *( ) 9 i *( *( O+ y O ) Mu`tc 4 Ackimce J O

9 {{C f } 4 {C f } soeciut mu`k uftu` O}

akf

9 {{C f } 4 {C f } soeciut mu`k uftu` O + y } Morakskr`kf òfyktkkf mkhwk (fm4 e ( C f ) 9 e ( k , m ) 9 m ∝ k akf e ( C f + y ) 9 e ( k + y , m + y ) 9 m ∝ k ) {C f } ∈ J O ⇝ {C f + y} ∈ JO + y akf {C f } ∈ JO + y ⇝ {C f ∝ y} ∈ JO J O + y

Dkac kak `lrosplfaofsc `lrosplfaofsc ;-; kftkrk J  O akf J  O+y , ktku J O ∵ J O + y Akrc scfc ik`k, i * ( O ) 9 cfj e ( C f ) (iofurut aojcfcsc)

∛ cfj ∛ e ( C + y ) (sotckp C  kak `lrosplfaofsc ;-; kftkrk J akf J ) cfj ∛ e ( C + y )

{C f }∈J O

9 {C } J f

9

∈

f

f

O

O+y

O

{ C f + y }∈J O + y

f

9 i * ( O + y )

 Rrlplscsc 4 Acmorc`kf somkrkfg hcipufkf K akf ο  6 6 2, ik`k 4 ;. Qorakpkt hcipufkf hcipufkf tormu`k L soaoic`ckf sohcfggk K ⊍ L akf *( L ) ≡ i *( *( i *( K ) + ο =. Qorakpkt G ∈ Gα  soaoic`ckf sohcfggk K ⊍ G akf *( *( G ) i *( K ) 9 i *( Mu`tc 4 Icske`kf ο  6 6 2 acmorc`kf. ;. _ftu` `ksus portkik, icske`kf i *( *( K ) 9 ∖ ackimce L 9  akf morekù *( L ) 9 ∖ ≡ ∖ + ο  9 9 i *( *( i *( K ) + ο 12

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

_ftu` `ksus òauk, icske`kf i *( *( K ) 5 ∖. Iofurut aojcfcsc uùrkf eukr, kak { C f } `leo`sc torhctufg akrc soekfg-soekfg mu`k aofgkf scjkt K ⊍ ∤ C f akf (`krofk i *( *( ik`k acgosor soac`ct mu`kf mu`kf ekgc cfjciui). K ) cfjciui, ik`k e (C f ) ≡ i * ( K) + ο Morakskr prlplscsc ; akf =, acporleoh i * (∤ Cf ) ≡ i * ( Cf ) 9 e ( C f ) ≡ i * ( K ) + ο

∛

∛

∛

Dc`k acpcech L 9 ∤ C f , ik`k L ioiofuhc K ⊍ L

akf

i * ( L ) ≡ i * ( K ) + ο

@krofk C f  mu`k, ik`k L 9 ∤ C f mu`k. =. @ksus portkik, dc`k i *( *( K ) 9 ∖ acpcech G 9  ik`k G ∈ Gα . @krofk G 9  ik`k K ⊍ G akf i *( *( *( G ). K ) 9 ∖ 9 i *( @ksus òauk, i *( *( K ) 5 ∖. Iofurut mu`tc mkgckf ;), torechkt mkhwk uftu` sotckp mcekfgkf ksec f  ∈ ∈  kak hcipufkf mu`k Lf  aofgkf scjkt K ⊍ Lf akf i * (Lf ) ≡ i * ( K ) + f ∝; Acaojcfcsc`kf G 9 ∣ Lf . @krofk Lf  mu`k uftu` sotckp f  ∈ ∈  , ik`k G mu`k. ôhcfggk G ∈ Gα @krofk K ⊍ Lf  akf G 9 ∣ Lf uftu` sotckp f  ∈ ∈  ik`k K ⊍ G

@krofk K ⊍ G ik`k *( *( G ) ……………………………… ……………………………….. (;) i *( K ) ≡ i *( Ac ekcf pchk`, `krofk G 9 ∣ Lf uftu` sotckp f  ∈ ∈  ik`k G ⊍ Lf

@krofk G ⊍ Lf  uftu` sotckp f  ∈ ∈  , ik`k i * (G) ≡ i * (Lf ) ≡ i * ( K) + f ∝; Akrc scfc acporleoh *( *( G ) …………………………… ……………………………… … (=) i *( K ) ≯ i *( Akrc (;) akf (=) acporleoh *( *( G ) i *( K ) 9 i *(

 ^kipkc ac scfc, uùrkf eukr ykfg acaojcfcsc`kf ac ktks suakh ioiofuhc ksuisc-ksuisc ykfg accfgcf`kf ònukec ksuisc ykfg ò->. Leoh `krofk ctu poreu acpormkc`c. >.>.

Hcipufkf Qoruùr _ùrkf eukr ykfg acaojcfcsc`kf somoeuifyk toraojcfcsc uftu` somkrkfg hcipufkf, k`kf totkpc mu`kf iorupk`kf uùrkf kactcj ykfg torhctufg. _ftu` iofdkac uùrkf kactcj torhctufg ik`k poreu hcipufkf pkak `leo`sc hcipufkf ykfg iorupk`kf kedkmkr- ώ. Aojcfcsc 4 Hcipufkf O ac`ktk`kf toruùr ( ioksurkmeo ) dc`k uftu` sotckp hcipufkf K morekù ioksurkmeo *( *( *( i *( K ) 9 i *( K ∣ O ) + i *( K ∣ O )n 1;

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

n @krofk soekeu morekù i *( *( *( *( torechkt mkhwk O toruùr dc`k uftu` K ) ≡ i *( K ∣ O ) + i *( K ∣ O ), n sotckp K morekù i *( *( *( *( K ) ≯ i *( K ∣ O ) + i *( K ∣ O ). Morakskr`kf aojcfcsc, dc`k O toruùr ik`k On  dugk toruùr. Nlftlh hcipufkf toruùr kakekh ∏ akf  .

Eoiik 4 Dc`k i *( *( O ) 9 2 ik`k O toruùr Mu`tc 4 Icske`kf K hcipufkf somkrkfg. @krofk K ∣ O ⊍ O, ik`k *(  K *( i *( K ∣ O ) ≡ i *( O ) 9 2 ôhcfggk i*(  K K ∣ O ) 9 2 @krofk K ⊎ K ∣ On , ik`k *( *(  K *(  K *(  K *(  K i *( K ) ≯ i *( K ∣ O )n 9 2 + i *( K ∣ O )n 9 i *( K ∣ O ) + i *( K ∣ O )n Dkac O toruùr.

 Eoiik 4 Dc`k O; akf O= toruùr ik`k O; ∤ O= toruùr. Mu`tc 4 Icske`kf K soimkrkfg hcipufkf. @krofk O= toruùr ik`k *( *( *( i *( K ∣ O; )n 9 i *( K ∣ O;n ∣ O= ) + i *( K ∣ O;n ∣ O= )n @krofk n ( K ∣ O; ) ∤ ( K ∣ O= ∣ O; )n 9 K ∣ ( O; ∤ ( O; ∣ O; )) n 9 K ∣ (( O; ∤ O= ) ∣ ( O; ∤ O; )) 9 ( K ∣ ( O; ∤ O= )) ∣  9 ( K ∣ ( O; ∤ O= )) ik`k i*( *( *( K ∣ ( O; ∤ O= )) ≡ i *( K ∣ O; ) + i *( K ∣ O= ∣ O; )n ôhcfggk, *( *( *( i *( K ∣ ( O; ∤ O= )) + i *( K ∣ ( O; ∤ O= ) )n 9 i *( K ∣ ( O; ∤ O= )) + i*( K ∣ O;n ∣ O= )n *( *( *( ≡ i *( K ∣ O; ) + i *( K ∣ O= ∣ O; )n + i *( K ∣ O;n ∣ O= )n 9 i *( *( *( K ∣ O; ) + i *( K ∣ O; )n 9 i *( *( K )

 K`cmkt 4 @leo`sc hcipufkf-hcipufkf toruùr I iorupk`kf kedkmkr hcipufkf Eoiik 4 Icske`kf K hcipufkf soimkrkfg akf O;, . . ., Of  mkrcskf hcfggk akrc hcipufkf toruùr ykfg skecfg eopks ( acsdlcft ), ik`k acsdlcft

⎐ ⎫ f ⎡ ⎖ f i * ⎕ K ∣ ⎭∤ Oc ⎯ ⎜ 9 ∛ i * ( K ∣ Oc ) ⎮ c 9; ⎪ ⎢ c 9; ⎙ Mu`tc 4 Mu`tc iofggufk`kf cfau`sc pkak f . Rorfyktkkf doeks mofkr uftu` f  9 9 ; Ksuisc`kf mkhwk porfyktkkf porfyktkkf mofkr uftu` uftu` f  „ „ ;, ykctu 4

⎐ ⎫ f ∝; ⎡ ⎖ f ∝; i * ⎕ K ∣ ⎭∤ Oc ⎯ ⎜ 9 ∛ i * ( K ∣ Oc ) ⎮ c 9; ⎪ ⎢ c 9; ⎙ @krofk Oc  skecfg eopks, ik`k 1=

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

⎫ f ⎮ c 9;

⎡ ⎪

K ∣ ⎭∤ Oc ⎯ ∣ Of

9 ( K ∣ Of )

akf

⎫f ⎡ ⎫ f ∝; ⎡ n K ∣ ⎭∤ Oc ⎯ ∣ Of 9 K ∣ ⎭∤ Oc ⎯ ⎮ c 9; ⎪ ⎮ c 9; ⎪ @krofk Oc  toruùr ik`k

⎐ ⎐ ⎖ ⎐ ⎖ ⎫ f ⎡⎖ ⎫f ⎡ ⎫ f ⎡ i * ⎕ K ∣ ⎭∤ Oc ⎯ ⎜ 9 i * ⎕ K ∣ ⎭∤ Oc ⎯ ∣ Of ⎜ + i * ⎕ K ∣ ⎭ ∤ Oc ⎯ ∣ Ofn ⎜ ⎮ c 9; ⎪ ⎢ ⎮ c 9; ⎪ ⎮ c 9; ⎪ ⎙ ⎙ ⎢ ⎙ ⎢

Akrc scfc, ik`k

⎐ ⎐ ⎫ f ⎡⎖ ⎫ f ∝; ⎡ ⎖ i * ⎕ K ∣ ⎭∤ Oc ⎯ ⎜ 9 i * ( K ∣ Of ) + i * ⎕ K ∣ ⎭∤ Oc ⎯ ⎜ ⎮ c 9; ⎪ ⎢ ⎮ c 9; ⎪ ⎢ ⎙ ⎙ f ∝;

9 i * ( K ∣ Of ) + ∛ i * ( K ∣ Oc ) c 9;

f

9 ∛ i * ( K ∣ Oc ) c 9;

 K`cmkt 4 @leo`sc hcipufkf-hcipufkf toruùr I iorupk`kf kedkmkr- ώ Mu`tc 4 (soo ‘]oke Kfkeyscs–, >ra oa., H.E. ]lyaof, pkgo :2)

 Eoiik 4 ôekfg (k, ∖ ) toruùr Mu`tc 4 Icske`kf K soimkrkfg hcipufkf akf ο  6 6 2 acmorc`kf. K; 9 K ∣ ( k k, ∖ ) Y K= 9 K ∣ („ ∖, k K`kf acmu`tc`kf mkhwk *( *( *( i *( K; ) + i *( K= ) ≡ i *( K ) Dc`k i *( *( K ) 9 ∖, ik`k mu`tc soeoskc. Dc`k i *( *( K ) 5 ∖, ik`k torakpkt `leo`sc torhctufg hcipufkf mu`k { C f } ykfg iofyoeciutc K akf morekù 4 e ( C f ) ≡ i * ( K ) + ο

∛

Icske`kf C f 9 C f ∣ ( k , ∖ ) akf C f 9 C f ∣ ( ∝∖, k Y ik`k C f ' akf C f '' iorupk`kf soekfg (ktku `lslfg) akf (C (C– (C–– *( C– *( C–– e ( C ) f 9 e ( C –  ) C ––  ) C–  ) C–– f  ) f + e ( f 9 i *( f + i *( @krofk K; ⊍ ∤ C f ' , ik`k '

''

i * ( K; ) ≡ i * ( ∤ C f' ) ≡

∛ i * ( C )

i * ( K= ) ≡ i * ( ∤ C f'' ) ≡

∛ i * ( C )

'

f

@krofk K= ⊍ ∤ C f '' , ik`k ôhcfggk, i * ( K; ) + i * ( K= ) ≡

∛ ( i * ( C ) + i * ( C ) ) ≡ ∛ e ( C ) ≡ i * ( K ) + ο ' f

'' f

f

1>

''

f

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

@krofk ο  6 6 2 soimkrkfg, ik`k i *( *( *( *( K; ) + i *( K= ) ≡ i *( K )



Qolroik 4 ôtckp hcipufkf Mlroe toruùr Mu`tc 4 (soo ‘]oke Kfkeyscs–, >ra oa., H.E. ]lyaof, pkgo :;)

Mor`kctkf aofgkf tolroik ac ktks, I iorupk`kf kedkmkr- ώ ykfg ioiukt sotckp soekfg ykfg mormoftu` ( k k, ∖ ) akf M kedkmkr-ώ torònce ykfg ioiukt soekfgsoekfg soportc ctu. Akeki tolroik dugk acporleoh mkhwk sotckp hcipufkf mu`k akf tutup toruùr. >.1.

_ùrkf Eomosguo Dc`k O hcipufkf toruùr, acaojcfcsc`kf uùrkf Eomosguo ( Eomosguo Ioksuro  ) i ( ( O ) somkgkc uùrkf eukr akrc O. sohcfggk i  kakekh kakekh jufgsc hcipufkf ykfg acporleoh aofgkf ioimktksc jufgsc hcipufkf i * ò `leo`sc hcipufkf toruùr I. Dkac, dc`k I kakekh `leo`sc hcipufkf toruùr akf O ∈ I. _ùrkf Eomosguo akrc O, kakekh ( O ) 9 i *( *( i ( O )

Auk scjkt poftcfg akrc uùrkf Eomosguo acrcfg`ks akeki prlplscsc-prlplscsc morcùt4 Rrlplscsc 4 Icske`kf 5 Oc 6 mkrcskf hcipufkf toruùr, ik`k

∛ i( O ) i ( ∤ O ) 9 ∛ i( O ) , dc`k 5 O 6 skecfg eopks.

(c) i ( ∤ Oc ) ≡

c

(cc)

c

c

c

Mu`tc 4 (c) Doeks akrc prlplscsc prlplscsc; pkak sum-mkm >.= (cc) Dc`k 5 Oc 6 mkrcskf hcfggk ykfg skecfg eopks, ik`k iofurut eoiik = pkak sum-mkm >.> aofgkf ioicech K 9  acporleoh 4

⎐ ⎫ f ⎡⎖ f ⎐ f ⎖ f i * ⎕  ∣ ⎭∤ Oc ⎯ ⎜ 9 ∛ i * (  ∣ Oc ) ⇑ i * ⎕ ∤ Oc ⎜ 9 ∛ i * ( Oc ) ⎮ c 9; ⎪ ⎢ c 9; ⎙ c 9; ⎢ c 9; ⎙

Dc`k 5 Oc 6 mkrcskf tk`hcfggk ykfg skecfg eopks, ik`k f

∖

c 9;

c 9;

∤ Oc ⊍ ∤ Oc akf

⎐∖ ⎖ ⎐ f ⎖ f i ⎕ ∤ Oc ⎜ ≯ i ⎕ ∤ Oc ⎜ 9 ∛ i( Oc ) ⎙ c 9; ⎢ ⎙ c 9; ⎢ c 9; @krofk ruks `crc pkak òtcak`skikkf ac ktks tcak` morgkftufg pkak f , acporleoh

⎐∖ ⎖ ∖ i ⎕ ∤ Oc ⎜ ≯ ∛ i( Oc ) ⎙ c 9; ⎢ c 9; @omkec`kf akrc òtk`skikkf ac ktks acporleoh akrc (c).

 Rrlplscsc 4 Icske`kf 5 Of 6 mkrcskf hcipufkf toruùr ykfg ilfltlf turuf. Dc`k i ( ( O ; ) hcfggk, ik`k

; Icske`kf

{ Kf } `leo`sc = Icske`kf K hcipufkf

torhctufg pkak  , ik`k… (echkt hke. >8) soimkrkfg akf O;, . . ., Of  mkrcskf hcfggk akrc hcipufkf toruùr ykfg skecfg eopks ik`k… (echkt hke. >3) 11

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

⎐∖ ⎙ c 9;

⎖ ⎢

i ⎕ ∣ Oc ⎜ 9 eci i( Of ) f ↝∖

Rofdoekskf 4 Ilfltlf turuf krtcfyk Oc +; +; ⊍ Oc _ùrkf akrc-fyk skik aofgkf ecictfyk.

J c c

J =

J >

J ;

Mu`tc 4 ∖

Icske O 9 ∣ Oc akf J c  9 Oc  „ Oc +; +;. Ik`k O; „ O 9 c 9;

∖

∤ J c akf J c  skecfg eopks. Dkac, c 9;

∖

⎐ ⎖ ⎜ 9 ∛ i( Jc ) ; c ⎙ 9 ⎢ c 9; ∖

i ⎕ ∤ Jc

i( O; ∝ O ) 9

∖

∛ i( J ) c

c 9;

∖

9 ∛ i( Oc ∝ Oc +; ) c 9;

@krofk O ⊍ O;, ik`k O; 9 O ∤ ( O; „ O ). Dkac, ( O ; ) 9 i ( ( O ) + i ( ( O ; „ O )  i ( ( O ; „ O ) 9 i ( ( O ; ) „ i ( ( O ) i ( @krofk Oc +; Oc  „ Oc +; +; ⊍ Oc , ik`k Oc  9 Oc +; +; ∤ ( +; ). Dkac, ( O )c 9 i ( ( O c +; ( O c  „ Oc +; ( O c  „ Oc +; ( O )c „ i ( ( O c +; i ( +; ) + i ( +; )  i ( +; ) 9 i ( +; ) Akrc scfc ik`k, i (O; ) ∝ i ( O)

∖

9 ∛ i( Oc ) ∝ i( Oc +;) c 9;

f ∝;

9 eci ∛ i ( Oc ) ∝ i( Oc +; ) f ↝∖

c 9;

9 eci i (O; ) ∝ i( Of ) f ↝∖

9 i ( O; ) ∝ eci i( Of ) f ↝∖

i ( O)

9 eci i( Of ) f ↝∖

 Rrlplscsc 4 Icske`kf O suktu hcipufkf. Ecik porfyktkkf morcùt kakekh oùcvkeof. ;. O hcipufkf toruùr =. ∂ο  6 6 2, kak hcipufkf mu`k L ⊎ O sohcfggk i *( *( L „ O ) 5 ο >. ∂ο  6 6 2, kak hcipufkf tutup J ⊍ O sohcfggk i *( *( ) 5 ο O „ J 1. Qorakpkt G ac Gα  aofgkf O ⊍ G sohcfggk i *( *( G „ O ) 9 2 ?. Qorakpkt J  ac ac J ώ *( ) 9 2 J ⊍ O sohcfggk i *( O „ J ώ aofgkf Dc`k i *( *( òecik porfyktkkf ac ktks oùcvkeof aofgkf O ) hcfggk, ik`k òecik :. ∂ο  6 6 2 torakpkt hcipufkf _ , ykctu gkmufgkf hcfggk akrc momorkpk soekfg mu`k sohcfggk *( _ i *( _ ∊ O ) 5 ο 1?

Mkm > „ _ùrkf Eomosguo

>.?.

Nlipceoa my 4 @hkorlfc, ^.^c

Jufgsc Qoruùr Rrlplscsc 4 Icske`kf j   jufgsc roke aofgkf akorkh kske hcipufkf toruùr. @ooipkt porfyktkkf morcùt oùcvkeof. ;. ∂λ ∈  , {x | j ( x ) 6 λ } hcipufkf toruùr =. ∂λ ∈  , {x | j ( x ) ≯ λ } hcipufkf toruùr >. ∂λ ∈  , {x | j ( x ) 5 λ } hcipufkf toruùr 1. ∂λ ∈  , {x | j ( x ) ≡ λ } hcipufkf toruùr @ooipkt porfyktkkf ac ktks iofgk`cmkt`kf ?. ∂λ ∈  , {x | j ( x ) 9 λ } hcipufkf toruùr Mu`tc 4 Mu`tc ccc) ⇑ cv) Ackimce somkrkfg mcekfgkf roke λ . @krofk ∖ ;⎠ ⎧ λ | ( ) {x j x ≡ } 9 ∣ ⎨x | j ( x ) 5 λ + ⎥ f ⎩ f 9; ⎣ akf crcskf akrc mkrcskf hcipufkf toruùr kakekh toruùr ik`k hcipufkf { x  | | j ( ( x) x) ≡ λ } toruùr. ômkec`fyk, `krofk ∖ ;⎠ ⎧ {x | j ( x ) 5 λ } 9 ∤ ⎨x | j ( x ) ≡ λ ∝ ⎥ f ⎩ f 9; ⎣ akf gkmufgkf akrc mkrcskf hcipufkf toruùr kakekh toruùr ik`k hcipufkf { x | j ( (x) ) 5 λ } x toruùr. Mu`tc c) ⇑ cc) Ackimce somkrkfg mcekfgkf roke λ . @krofk ∖ ;⎠ ⎧ {x | j ( x ) ≯ λ } 9 ∣ ⎨x | j ( x ) 6 λ ∝ ⎥ f ⎩ f 9; ⎣ akf crcskf akrc mkrcskf hcipufkf toruùr kakekh toruùr ik`k hcipufkf { x  | | j ( ( x) x) ≯ λ } toruùr. ômkec`fyk, `krofk ∖ ;⎠ ⎧ {x | j ( x ) 6 λ } 9 ∤⎨x | j ( x ) ≯ λ + ⎥ f ⎩ f 9; ⎣ akf gkmufgkf akrc mkrcskf hcipufkf toruùr kakekh toruùr ik`k hcipufkf { x | j ( (x) ) 6 λ } x toruùr. (tho rost, soo ‘]oke Kfkeyscs–, >ra oa., H.E. ]lyaof, pkgo :? „ ::)

 Aojcfcsc 4 Jufgsc j   ac`ktk`kf toruùr (Eomosguo), dc`k akorkh kske jufgsc j   toruùr akf skekh sktu akrc òoipkt porfyktkkf akeki prlplscsc ac ktks morekù. Nlftlh 4 Acòtkhuc j 4 A  ↝ ↝  jufgsc toruùr. Acaojcfcsc`kf j + 9 ikx( 2, j ) akf j ∝ 9 ikx( 2, ∝ j ) Aofgkf iofggufk`kf aojcfcsc jufgsc toruùr, mu`tc`kf mkhwk j + akf j  „  toruùr. Mu`tc 4 @krofk j toruùr, ik`k A 9 A + 9 A  j ∝ toruùr.

Icske`kf, {x 4 j + ( x ) 6 λ } 9 K . λ 5 2 ⇝ K 9 A λ

≯ 2 ⇝ {x 4 j + ( x ) 6 λ } 9 {x 4 j ( x ) 6 λ } 1:

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

Icske`kf, {x 4 j ∝ ( x ) 6 λ } 9 M . λ 5 2 ⇝ M 9 A λ ≯ 2 ⇝ {x 4 j ∝ ( x ) 6 λ ≯ 2} 9 {x 4 ∝ j ( x ) 6 λ } 9 {x 4 j ( x ) 5 ∝λ } Iofurut aojcfcsc, tormu`tc mkhwk j + akf j  „  toruùr.



Roreu acnktkt mkhwk, j  jufgsc jufgsc `lftcfu aofgkf akorkh kske ykfg toruùr kakekh jufgsc toruùr. Mu`tc 4 Icske`kf j 4 A  ↝ hcipufkf toruùr akf j jufgsc `lftcfu. @krofk A  hcipufkf hcipufkf ↝  aofgkf A  hcipufkf toruùr, ik`k A  j 9 A   hcipufkf toruùr. K`kf acmu`tc`kf mkhwk ∂λ ∈  morekù {x 4 j ( x ) 6 λ } toruùr kakekh hcipufkf toruùr. Ackimce somkrkfg λ ∈  `krofk (λ , ∖ )} {x 4 j ( x ) 6 λ } 9 {x 4 j ( x ) ∈

9 j ∝;((λ , ∖ )) ⊊ A Cftorvke (λ , ∖ ) kakekh hcipufkf mu`k ac  . Morakskr`kf tolroik, acporleoh j ∝;((λ , ∖ )) iorupk`kf hcipufkf mu`k ac A . @krofk j ∝;((λ , ∖ )) 9 ∤ ( k ` , m ` ) `

akf sotckp cftorvke/soekfg kakekh hcipufkf toruùr ik`k {x 4 j ( x ) 6 λ } hcipufkf toruùr.

 ôtckp jufgsc tkfggk iorupk`kf jufgsc toruùr. Dc`k j  jufgsc jufgsc toruùr akf O hcipufkf toruùr akeki akorkh kske, ik`k mktkskf j  torhkakp torhkakp O, j | O dugk toruùr. Rrlplscsc 4 Icske`kf n  suktu suktu `lfstkftk, j  akf akf g  auk auk jufgsc roke ykfg toruùr akeki akorkh kske ykfg skik, ik`k jufgsc j  + + n , nj , j  + + g , j  „ „ g , akf jg  dugk dugk toruùr Mu`tc 4 (soo ‘]oke Kfkeyscs–, >ra oa., H.E. ]lyaof, pkgo ::) Qolroik 4 Icske`kf 5 j f 6 mkrcskf jufgsc toruùr, ik`k

sup{ j ; , j = , , j f } , cfj{ j ; , j = ,  , j f } , sup{ j f } , cfj{ j f } , eci j f , akf eci j f f

f

kakekh jufgsc-jufgsc toruùr. Mu`tc 4 Rortkik, acmu`tc`kf mkhwk sup{ j ; , j = ,  , j f } jufgsc toruùr. @krofk j c , c  9 9 ;, =, . . ., f  toruùr toruùr ik`k A toruùr. Icske c

j

9 sup{ j ; , j = , , j f }

akf f

A

9 ∣ A  j c 9;

c

ik`k A  j  toruùr. Ackimce somkrkfg λ ∈  . K`kf acmu`tc`kf mkhwk {x 4 j ( x ) 6 λ } . Dc`k j ( x ) 9 sup{ j ; ( x ), j = ( x ), , j f ( x )} 6 λ ik`k kak c , ; ≡ c ≡ f  sohcfggk sohcfggk j c ( x x ) 6 λ . Dkac, f

{x 4 j ( x ) 6 λ } ⊊ ∤ {x 4 j c ( x ) 6 λ } c 9;

Dc`k j c ( x uftu` suktu c , ; ≡ c ≡ f  ik`k ik`k sup{ j ; ( x ), ) , j = ( x ), ) , , j f ( x )} ) } 6 λ ⇑ j (x ) 6 λ . Dkac, x ) 6 λ  uftu`

17

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c f

∤{x 4

j c ( x ) 6 λ } ⊊ {x 4 j ( x ) 6 λ }

c 9;

@oscipuekffyk f

{x 4 j ( x ) 6 λ } 9 ∤{x 4 j c ( x ) 6 λ } c 9;

{x 4 j c ( x ) 6 λ } toruùr. @krofk gkmufgkf torhctufg akrc hcipufkfhcipufkf toruùr kakekh toruùr ik`k {x 4 j ( x ) 6 λ } toruùr. Dkac tormu`tc j  toruùr. toruùr.

@krofk j c   toruùr ik`k

(scskfyk echkt ‘]oke Kfkeyscs–, > ra oa., H.E. ]lyaof, pkgo :7)

 Aojcfcsc 4 (c) j  9 9 g  k.o k.o dc`k j  akf akf g  ioipufykc ioipufykc akorkh kske ykfg skik akf i {x | j ( (x   ) ≢ g ( (x   )} x x 92 (cc) j f   `lfvorgof ò g   hkipcr ac ikfk-ikfk, dc`k torakpkt hcipufkf O ykfg moruùrkf fle sohcfggk j f ( x (x   ) uftu` sotckp x ∃ O. x ) `lfvorgof ò g ( x Rrlplscsc 4 Dc`k j  jufgsc jufgsc toruùr akf j  9 9 g  k.o, k.o, ik`k g  jufgsc jufgsc toruùr. Mu`tc 4 @krofk j  9 9 g  (ko) (ko) ik`k i ({ ({x 4 j ( (x   ) ≢ g ( ( x ( k (k ({k }) }) 9 2. Dkac, x x )}) 9 2. Icske`kf j ( k ) ≢ g ( k  ), ik`k i ({ ∂x ∈ A j 9 A g ∝ {k } j ( x ) 9 g ( x ),

Ackimce somkrkfg λ ∈  . K`kf acmu`tc`kf { x  4 4 g ( (x   ) 6 λ } toruùr. x c) Dc`k j ( ( k ( k k ) 5 g ( k ) 5 j ( (k (k • Dc`k λ  5 k  ) 5 g ( k  ) {x 4 g ( x ) 6 λ } 9 {x 4 j ( x ) 6 λ } toruùr 5 g ( (k • Dc`k j ( (k k  ) 5 λ  5 k  ) {x 4 g ( x ) 6 λ } 9 {x 4 j ( x ) 6 λ } ∤{k} toruùr (k • Dc`k j ( (k k  ) 5 g ( k  ) 5 λ {x 4 g ( x ) 6 λ } 9 {x 4 j ( x ) 6 λ } toruùr cc) Dc`k j ( ( k ( k k ) 6 g ( k ) (k • Dc`k λ 6 j ( (k k  ) 6 g ( k  ) {x 4 g ( x ) 6 λ } 9 {x 4 j ( x ) 6 λ } toruùr 6 g ( (k • Dc`k j ( (k k  ) 6 λ  6 k  ) {x 4 g ( x ) 6 λ } 9 {x 4 j ( x ) 6 λ } ∝ {k} toruùr (k) • Dc`k j ( (k k  ) 6 g ( k ) 6 λ

 Rrlplscsc 4 Icske`kf j   jufgsc toruùr pkak P k Y, akf j  morfcekc morfcekc »∖ hkfyk pkak hcipufkf ykfg moruùrkf k, m fle, ik`k uftu` sotckp ο   6 2, torakpkt jufgsc tkfggk g   akf suktu jufgsc `lftcfu h   ykfg ioiofuhc | j „ g | 5 ο  akf akf | j  „ „ h | 5 ο @onukec pkak hcipufkf ykfg moruùrkf eomch ònce akrc ο , ykctu 4 (x   ) „ g ( (x   ) ≯ ο } 5 ο , akf i {x | | j ( (x   ) „ h ( (x   )| i {x | | j ( x x x x ≯ ο } 5 ο ômkgkc nktktkf, dc`k i ≡ j ≡ I , pcech jufgsc g  akf akf h  ykfg ykfg ioiofuhc i ≡ g ≡ I  akf akf i ≡ h ≡ I Mu`tc 4 Mu`tc acmkgc iofdkac auk mkgckf

18

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

;) Icske`kf j  jufgsc jufgsc toruùr ykfg acaojcfcsc`kf pkak P k Y akf i ( {x 4 j ( x )   9 »∖} ) 9 2. K`kf k , m acmu`tc`kf mkhwk ∂ο 6 2, ∎I ∀ j ≡ I ònukec pkak hcipufkf ykfg uùrkffyk ùrkfg akrc ο . Oùcvkeof aofgkf iofudu``kf kak I sohcfggk i ({x ∈ P k , m Y 4 j ( x ) 6 I } ) 5 ο . Icske`kf f ∈  somkrkfg. Acaojcfcsc`kf Of 9 {x ∈ P k , m Y4 Y4 j (x )

6 f }

ykctu, O;

9 {x ∈ P k , m Y 4 j ( x ) 6 ;}

O=

9 {x ∈ P k , m Y 4 j ( x ) 6 =} 

Y4 j ( x ) Of 9 { x ∈ P k , m Y4 Of +;

6 f }

9 {x ∈ P k , m Y 4 j ( x ) 6 f + ;}

@krofk Of 9 {x ∈ P k , m Y4 Y4 j (x )

6 f } 9 {x ∈ P k , m Y 4 j ( x ) 6 f ∨ j ( x ) 5 ∝f} 9 {x ∈ P k , m Y 4 j ( x ) 6 f} ∤ {x ∈ P k , m Y 4 j ( x ) 5 ∝f }

akf j  toruùr, toruùr, ik`k Of  toruùr. @krofk ∂f ∈  morekù f  + + ;6 f sohcfggk dc`k j ( x ) 6 f + ; ik`k j ( x ) 6 f . K`cmktfyk Of +;

9 {x ∈ P k , m Y 4 j ( x ) 6 f + ;} ⊍ {x ∈ P k , m Y 4 j ( x ) 6 f} 9 Of

Rorhktc`kf mkhwk O; 9 {x ∈ P k , m Y 4 j ( x ) 6 ;} , ik`k i ( O; ) ≡ i (P k , m Y) ⇑ i ( O; ) ≡ m ∝ k 5 +∖

Dkac, i( O; ) morhcfggk. @krofk Of mkrcskf hcipufkf toruùr aofgkf Of +; ⊍ Of , ∂f ∈  akf i( O; ) morhcfggk ik`k acporleoh

⎐∖ ⎖ i ⎕ ∣ Of ⎜ 9 eci i ( Of ) 9 2 ⎙ f 9; ⎢ f ↝∖ K`cmktfyk morekù

∂ο 6 2, ∎ I ∀ i ( O I ) 5 ο ⇑ i ({x ∈ P k , m Y 4 j ( x ) 6 I } ) 5 ο Hke Hke cfc cfc mork morkrt rtcc j ( x ) ≡ I  ònukec pkak hcipufkf {x ∈ P k , m Y4 Y 4 j ( x ) 6 I }  ykfg uùrkffyk ùrkfg akrc ο . =) Icske`kf j  jufgsc jufgsc toruùr ykfg acaojcfcsc`kf pkak P k Y akf i ( {x 4 j ( x )   9 »∖} ) 9 2. K`kf k , m acmu`tc`kf mkhwk ∂ο 6 2 akf I , kak jufgsc soaorhkfk ϟ sohcfggk soaoic` c`kf kf sohc sohcfg fggk gk j ( x ) ≡ I j ( x ) ∝ ϟ( x ) 5 ο , ∂x soaoi Icske`kf ο  6 6 2 akf I   acmorc`kf. Rcech F   mcekfgkf ksec sohcfggk

∂` ∈{∝ F , ∝F + ;,… , F ∝ ;}

13

I F

5 ο . Acaojcfcsc`kf

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

O`

I I 9 ⎧⎨x ∈ P k , m Y 4 j ( x ) ≯ ` ⎠⎥ ∣ ⎧⎨x ∈ P k , m Y 4 j ( x ) 5 ( ` + ;) ⎠⎥ F ⎩ ⎣ F ⎩ ⎣

@krofk j  toruùr, toruùr, ik`k O` toruùr. Acaojcfcsc`kf jufgsc ϟ , ykctu

⎧ F ∝; I , x ∈ O` ⎤∛` ϟ ( x ) 9 ⎨` 9∝ F F ⎤2 , x ∃ O` ⎣ Dc`k x ∈P k , m Y sohcfggk j ( x ) 5 I  ik`k x ∈ O` uftu` suktu ` sohcfggk `

@krofk x ∈ O` ik`k ϟ ( x ) 9 `

I F

I F

≡ j ( x ) 5 ( ` + ;)

I F

. K`cmktfyk

j ( x ) ∝ ϟ ( x )

5 ( ` + ;)

I

F

∝`

I F

9

I F

5 ο 

Icske`kf K soimkrkfg hcipufkf, akf acaojcfcsc`kf jufgsc `krk`torcstc` akrc hcipufkf K, ykctu χ  K somkgkc morcùt4 ⎧; , x ∈ K χ  K ( x ) 9 ⎨ ⎣2 , x ∃ K Jufgsc χ  K toruùr dc`k akf hkfyk dc`k K toruùr. Aojcfcsc 4 Jufgsc morfcekc roke ϟ  ac`ktk`kf ac`ktk`kf soaorhkfk ( scipeo ), dc`k ϟ  toruùr toruùr akf ioicec`c hkfyk soduiekh scipeo morhcfggk fcekc.

Dc`k ϟ   soaorhkfk ( scipeo ) akf morfcekc λ ;, λ =, . . ., λ f   ik`k ϟ 9 scipeo

f

∛λ χ c 9;

Kc

c

Kc

aofgkf

9 {x 4 j ( x ) 9 λ c } . Rofduiekhkf akf pofgurkfgkf auk jufgsc soaorhkfk kakekh soaorhkfk. Nlftlh 4 Jufgsc tkfggk

⎧;, 2 5 x 5 ; ⎤ j ( x ) 9 ⎨=, ; 5 x 5 > ⎤>, > 5 x 5 1 ⎣ akpkt actuecs iofdkac

j ( x ) 9 ;.χ K;

aofgkf K;

+ =.χ K

=

1 ) akf K= 9 (;,>) 9 ( 2, ;) ∤ ( >, 1)

 >.:.

Qcgk Rrcfscp Ectteowlla D. O. Ectteowlla iofgktk`kf mkhwk torakpkt tcgk prcfscp akeki tolrc jufgsc roke ykfg mkfyk` acgufk`kf, ykctu4 ;. Hkipcr sotckp hcipufkf (toruùr) iorupk`kf gkmufgkf morhcfggk soekfg-soekfg =. Hkipcr sotckp jufgsc (toruùr) iorupk`kf jufgsc `lftcfu >. Hkipcr sotckp mkrcskf jufgsc (toruùr) ykfg `lfvorgof kakekh `lfvorgof sorkgki Rrcfscp portkik akf òauk toekh actoiuc akeki poimkhkskf somoeuifyk. Moftu`-moftu` uftu` ?2

Mkm > „ _ùrkf Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

prcfscp portkik akf akpkt acechkt pkak prlplscsc somoeuifyk. Nlftlh prcfscp òtcgk acmorc`kf pkak prlplscsc morcùt cfc4 Rrlplscsc 4 Icske`kf O ioicec`c uùrkf hcfggk, 5 j f 6 mkrcskf jufgsc toruùr pkak O, akf j  jufgsc jufgsc morfcekc roke. Dc`k uftu` sotckp x  ac ac O morekù j f ( x ( x 6 2 ykfg acmorc`kf x ) ↝ j ( x ), ik`k uftu` ο 6 2 akf α  6 torakpkt hcipufkf toruùr K ⊍ O aofgkf i ( ( K ) 5 α  akf akf mcekfgkf ksec F  soaoic`ckf soaoic`ckf sohcfggk uftu` sotckp x ∃ K akf sotckp f ≯ F  morekù morekù | j f ( я ) „ j ( (я   )| 5 ο я я Mu`tc 4 Acmorc`kf ο , α 6 2 somkrkfg ∂f ∈  acaojcfcsc`kf Gf

9 {x ∈ O 4 j f ( x ) ∝ j ( x ) ≯ ο }

akf ∂f ∈  acaojcfcsc`kf Of

9 ∤ G` ` ≯ f

9 {x ∈ O 4

j f ( x ) ∝ j ( x )

≯ ο , uftu` suktu ` ≯ f}

ôhcfggk O; ⊎ O= ⊎ O>  ↝ {Of } turuf iofudu Rorhktc`kf mkhwk ∂x ∈ O, eci j f ( x ) 9 j ( x )

∣ Of .

f ↝∖

x ∈ O , ∂ο

6 2, ∎f2 ∈  sohcfggk uftu` f ≯ f2 ⇝ j f ( x ) ∝ j ( x ) 5 ο Dkac, x ∈ Ofn ⇝ x ∃ Of . ôhcfggk ∣ Of 9 ∏ . 2

2

Dkac, Of  turuf iofudu ∏  . ôhcfggk eci i( Of ) 9 2 f ↝∖

@krofk eci i( Of ) 9 2 ik`k uftu` α  6 6 2 ac ktks, ∎ F ∈  sohcfggk uftu` f ≯ F  morekù4 f ↝∖

i( Of ) ∝ 2

5 α ⇑ i( Of ) 5 α

Kimce K 9 Of ⊍ O toruùr akf i( K ) 5 α . K n

9 Of n 9 {x ∈ O 4 j f ( x ) ∝ j ( x ) 5 ο , ∂f ≯ F } 

Dc`k acakeki hcpltoscs prlplscsc ac ktks j f ( x ( x x ) ↝ j ( x ) uftu` sotckp x , ac`ktk`kf mkhwk 5 j f 6 `lfvorgof tctc`-aoic-tctc` ( nlfvorgos ) ò j  pkak pkak O. Dc`k kak hcipufkf M ⊍ O aofgkf i ( (M ) 9 2 nlfvorgos  plcftwcso plcftwcso soaoic`ckf sohcfggk j f ↝ j tctc`-aoic-tctc` pkak O „ M, ac`ktk`kf mkhwk j f ↝ j k.o pkak O. Rrlplscsc 4 Icske`kf O hcipufkf toruùr akf mor-uùrkf hcfggk, akf 5 j f 6 mkrcskf jufgsc toruùr ykfg `lfvorgof ò jufgsc morfcekc roke j   k.o pkak O. Ik`k, uftu` uftu` ο 6 2 akf α   6 2 ykfg acmorc`kf, torakpkt hcipufkf K ⊍ O aofgkf i ( ( K ) 5 α , akf mcekfgkf ksec F   soaoic`ckf sohcfggk uftu` sotckp x ∃ K akf sotckp f ≯ F  morekù, morekù, | j f ( я ) „ j ( (я   )| 5 ο я я

?;

Mkm 1 Cftogrke Eomosguo 1.;.

Cftogrke ]coikff @ctk k`kf soac`ct iofguekfg òimkec momorkpk aojcfcsc pkikrtcsckf akeki Cftogrke ]coikff. Icske`kf j   jufgsc morfcekc roke ykfg tormktks akf toraojcfcsc pkak cftorvke P k Y akf icske`kf P k Y k, m k, m acpkrtcsc iofdkac f  mkgckf, mkgckf, ykctu4 4 k 9 ζ 2 5 ζ; 5  5 ζ f 9 m _ftu` sotckp pkrtcsc p torsomut, acaojcfcsc`kf Duiekh Ktks4

^ 9 Duiekh Ktks 9

f

∛ (ζ c 9;

∝ ζ c ∝; ) I c

c

akf s 9 Duiekh Mkwkh 9

f

∛ (ζ c 9;

acikfk, I c 9 sup

x ∈( ζc ∝; ,ζ c )

j ( x ) akf i c 9

cfj

x ∈( ζc ∝; ,ζ c )

∝ ζ c ∝; )i c

c

j ( x ) .

Akrc pofaojcfcsckf cfc torechkt mkhwk uftu` sotckp pkrtcsc p morekù, s ( p ) ≡ ^ ( p ) akf s ( p )  akf ^ ( p )  . @krofk pkrtcsc-pkrtcsc torsomut tcak` tufggke, ik`k akpkt acaojcfsc`kf

∠

Cftogrke Ktks ]coikff 9 ]

m

k

Cftogrke Mkwkh ]coikff 9 ]

j 9 cfj ^ p

∠

m

k

j 9 sup s p

@krofk s ( p ) ≡ ^ ( p ) , ∂p

ik`k

sup s ( p ) ≡ ^ ( p ), ∂p sup s( p ) ≡ cfj ^ ( p ) ]

∠

m

k

j ≡]

∠

m

k

j

ôhcfggk Cftogrke Ktks soekeu eomch akrc ktku skik aofgkf Cftogrke Mkwkh. Dc`k, ]

∠

m

j 9]

k

∠

m

k

j

ik`k j  acsomut acsomut torcftogrke ]coikff ( ]coikff Y akf iofyomut fcekc cftogrke òaukfyk ]coikff Cftogrkmeo  ) pkak P k k, m aofgkf Cftogrke ]coikff akrc j  akf akf acekimkfg`kf ]

∠

m

k

j ( x ) ax

uftu` ioimoak`kffyk aofgkf Cftogrke Eomosguo ykfg k`kf `ctk tcfdku òiuackf. Jufgsc Qkfggk Jufgsc tkfggk ψ kakekh jufgsc ykfg acaojcfcsc`kf leoh ψ ( x ) 9 n c , uftu` ζ c ∝; 5 x 5 ζ c Akrc pofaojcfcsckf cfc ik`k,

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c f

∠ ψ ( x ) a ( x ) 9 ∛ n ( ζ m

k

c 9;

m

j ( x ) a ( x ) 9 cfj

c

∝ ζ c ∝; )

c

Rorhktc`kf mkhwk

∠ ]∠ ]

∠ ψ ( x ) a ( x ) j ( x ) a ( x ) 9 sup ∠ ψ ( x ) a ( x ) ψ ≯ j k

k m

m

k

`krofk ψ ( x ) 9 I c , x ∈ (ζ c ∝; , ζ c ) ⇝ ^ 9

m

k

ψ ≡ j

∠

m

ψ ( x ) a x akf ϟ ( x ) 9 i c , x ∈ (ζ c ∝; , ζ c ) ⇝ s 9

k

m

∠ ϟ( x ) a x k

1.=.

Cftogrke Jufgsc Qormktks @ctk iuekc poimkhkskf pkak sum-mkm cfc aofgkf iofaojcfsc`kf suktu jufgsc ykfg morfcekc ; pkak suktu hcipufkf toruùr akf fle soekcffyk ykfg torcftogrke`kf akf ioicec`c cftogrke skik aofgkf uùrkf akrc hcipufkffyk. Jufgsc @krk`torcstc` Icske`kf O ⊍  hcipufkf toruùr. Acaojcfcsc`kf jufgsc `krk`torcsctc` akrc O aofgkf kturkf ⎧; x ∈ O χ  O ( x ) 9 ⎨ ⎣2 x ∃ O ôakfg`kf `limcfksc ecfokr ϟ( x ) 9

f

∛ k χ c 9;

c

Oc

( x )

acsomut jufgsc soaorhkfk dc`k hcipufkf Oc  toruùr. Nlftlh4 ϟ ( x ) 9 ;. χ( 2 , = ) + =. χ( ;, = ) + = χ ( = ,> )

dugk akpkt actuecs ϟ  dugk ϟ ( x ) 9 ;. χ( 2 ,;) + >.χ ( ;, = ) + = χ ( = ,> ) Dkac, roprosoftksc ϟ tcak` tufggke.

 Aojcfcsc (Moftu` @kflfc`) Dc`k ϟ  kakekh kakekh jufgsc soaorhkfk akf {k ;, k =, . . ., k f } kakekh hcipufkf fcekcfyk aofgkf k c ≢ 2, ik`k ϟ( x ) 9

f

∛ k χ c 9;

c

Kc

( x )

aofgkf Kc 9 {x 4 ϟ ( x ) 9 k c } acsomut roprosoftksc moftu` `kflfc` akrc ϟ . Nktktkf 4 ;. k c  soiuk moak akf k c ≢ 2. =. Kc  skecfg eopks >. Moftu` `kflfc` akrc suktu jufgsc soaorhkfk morscjkt tufggke Akrc scfc K 9 {ϟ 4 ϟ jufgsc tkfggk} akf M 9 {ϟ 4 ϟ jufg sc soaorhkfk} ⇝ K ⊍ M Aojcfcsc (Cftogrke Jufgsc ôaorhkfk) 4

Dc`k ϟ   kakekh jufgsc soaorhkfk akf ioipufykc moftu` `kflfc` ϟ ( x ) 9

f

∛ k χ c 9;

acaojcfcsc`kf

?>

c

Kc

( x )

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c f

∠ ϟ ( x ) ax 9 ∛ k i( K ) c 9;

c

c

∠

Fltksc 4 ϟ Nlftlh4 ϟ( x ) 9 ;. χ( 2 ,;) + >.χ ( ;, = ) + = χ ( = ,> )

∠ ϟ ( x ) ax 9 ;.i( 2, ;) + >.i(;, = ) + =.i( = , >) 9 ;.; + >.; + =.; 9: Eoiik morcùt cfc iofgktk`kf mkhwk aojcfcsc ac ktks morekù dugk uftu` jufgsc soaorhkfk ykfg tcak` acroprosoftksc`kf akeki moftu` `kflfc`-fyk. Eoiik 4

Icske`kf ϟ 9

f

∛ k χ c

c 9;

Oc

aofgkf Oc ∣ O d 9 ∏ uftu` c ≢ d . Icske`kf Oc toruùr akf i( Oc ) 5 ∖

∂c , ik`k f

∠ ϟ 9 ∛ k i ( O ) c 9;

c

c

( k kc   tcak` hkrus moak) Mu`tc 4 Acaojcfcsc`kf hcipufkf Kk 9 {x 4 ϟ ( x ) 9 k } . Akrc pofaojcfcsckf cfc, acporleoh mkhwk Kk 9

∤O

c

k c 9 k

Dkac, soiuk Oc   ykfg ioicec`c fcekc ykfg skik, somut k , acgkmufg ò akeki hcipufkf Kk . K`cmktfyk, Kk  skecfg kscfg. ôhcfggk,

⎐ ⎕ k 9 k ⎙

⎖ ⎜ ⎢

i( Kk ) 9 i ⎕ ∤ Oc ⎜ 9 c

∛ i( O ) k c 9 k

c

Akrc scfc, ik`k

∠ ϟ( x ) ax 9 ∠ ∛ k χ ( x ) 9 ∛ ki( K ) k c 9 k

Kk

k

k c 9 k

9 ∛ k ∛ i( Oc ) kc 9k

k c 9k

9 ∛ k c i ( Oc ) c

 Rrlplscsc 4 Dc`k ϟ akf ψ kakekh auk jufgsc soaorhkfk akf k , m ∈ , ik`k

;. =.

∠ kϟ + mψ 9 k ∠ ϟ + m ∠ψ Dc`k ϟ ≯ ψ (ko) ik`k ∠ ϟ ≯ ∠ψ

Mu`tc 4 Acòtkhuc ϟ , ψ jufgsc soaorhkfk. k , m ∈ . K`kf acmu`tc`kf

∠ kϟ + mψ 9 k ∠ ϟ + m ∠ψ .

Icske`kf roprosoftksc `kflfc` akrc òauk jufgsc torsomut kakekh ?1

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c f ;

∛ k χ

ϟ9

c 9;

c

Kc

akf ψ 9

f =

∛ m χ c 9;

c

Mc

Aofgkf Kc  akf Mc  skecfg eopks, k c  soiuk mormoak akf m c  soiuk mormoak uftu` sotckp c . Icske`kf f; f =

f { O` }; 9 { Kc ∣ M d }c 9; d 9; ( f 9 f; × f = )

Quecs`kf ϟ9

f

∛ k χ * `

` 9;

O`

akf ψ 9

f

∛ m χ ` 9;

* `

O`

aofgkf k `* ktku m `* iufg`cf kak ykfg skik. Dkac, f

∠ kϟ + mψ 9 ∠ k ∛ k χ * `

` 9;

f

O`

f

+ ∠ m ∛ m`* χ O

`

` 9;

f

9 ∠ ∛ kk χ O + ∠ ∛ km`* χ   O * `

` 9;

`

`

` 9;

f

9 ∠ ∛ ( kk `* + mm`* ) χ O

`

` 9;

f

9 ∛ ( kk `* + mm`* ) i( O` ) ` 9; f

f

9 ∛ kk i( O` ) + ∛ mm`* i( O` ) * `

` 9;

f

` 9;

f

9 k ∛ k i( O` ) + m ∛ m`* i ( O` ) ` 9;

* `

` 9;

9 k ∠ ϟ +m ∠ψ @oauk, `krofk ϟ ≯ ψ (ko) ik`k i {x 4ϟ ( x ) 5 ψ ( x )} 9 2 . ôhcfggk cftogrke-fyk tcak` acporhctufg`kf. Dkac, nuùp actcfdku uftu` ϟ ≯ ψ . @krofk ϟ ≯ ψ , aofgkf iofggufk`kf hksce pkak mkgckf portkik, acporleoh ϟ ∝ψ ≯ 2 ⇑ ϟ ∝ ψ ≯ 2 ⇑ ϟ ∝ ψ ≯ 2 ⇑ ϟ ≯ ψ

∠

∠

∠

∠

∠

∠

 K`cmkt 4

Dc`k ϟ 9

f

∛ k χ c 9;

c

Oc

aofgkf Oc  tcak` skecfg eopks, ik`k

∠

ϟ9

f

∛ ∠ c 9;

k c χ Oc 9

f

∛ k i( O ) c 9;

c

c

Dkac rostrc`sc Eoiik Eoiik ac ktks kgkr Oc  skecfg eopks tcak` ekgc acporeu`kf. Icske`kf O kakekh kakekh hcipuf hcipufkf kf ykfg ykfg toruù toruùrr aofgkf aofgkf i( O ) 5 ∖ . Jufgsc j  kakekh kakekh jufgsc morfcekc roke ykfg tormktks akf toraojcfcsc pkak O. Mkfacfg`kf moskrkf cfj ψ ( x ) ax akf cfj ϟ ( x ) ax

∠

∠

ψ ≯ j O

ϟ ≡ j O

acikfk ψ akf ϟ kakekh jufgsc soaorhkfk. ??

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

Rrlplscsc 4 Icske`kf j   kakekh jufgsc ykfg toraojcfcsc akf tormktks pkak hcipufkf toruùr O aofgkf i( O ) 5 ∖ .

cfj

∠ ψ ( x ) ax 9 sup ∠ ϟ ( x ) ax ⇑ j

ψ ≯ j O

ϟ ≡ j

O

kakekh jufgsc toruùr

acikfk ψ akf ϟ kakekh jufgsc soaorhkfk. Mu`tc 4

⇝

@krofk j   tormktks ik`k kak I 6 2 sohcfggk j ( x ) ≡ I , ∂x ∈ O . Kimce f ∈  somkrkfg. Acaojcfcsc`kf ∂` 9 ∝f ,..., f ` ∝; ` ⎠ ⎧ O` 9 ⎨x ∈ O 4 I ≡ j ( x ) ≡ I ⎥ f f ⎩ ⎣ ômkgkc ceustrksc, icske`kf f  9 9 =. Ik`k ` 9 „=, . . ., = aofgkf j  soportc soportc pkak gkimkr morcùt4 I `9=

> ⎧ ⎠ O∝= 9 ⎨x ∈ O 4 ∝ I ≡ j ( x ) ≡ ∝I ⎥ = ⎣ ⎩

`9;

; ⎠ ⎧ O∝; 9 ⎨x ∈ O 4 ∝ I ≡ j ( x ) ≡ ∝ I ⎥ = ⎩ ⎣

I /= /= 2 =

;

;

`92 „I /= /= ` 9 „; 9 „; „I ` 9 „ = „ > I/= I/=

; ⎧ ⎠ O2 9 ⎨x ∈ O 4 ∝ I ≡ j ( x ) ≡ 2⎥ = ⎣ ⎩ ; ⎠ ⎧ I ⎥ = ⎩ ⎣ ; ⎧ ⎠ O= 9 ⎨x ∈ O 4 I ≡ j ( x ) ≡ I ⎥ = ⎣ ⎩ O; 9 ⎨x ∈ O 4 2 ≡ j ( x ) ≡

Qorechkt O` toruùr (hcipufkf mu`k), O` skecfg eopks akf ∤ O` 9 O . ôhcfggk { O` } kakekh pkrtcsc. Icske`kf hkipcrkf ktks 4 ψ f , akf hkipcrkf mkwkh 4 ϟ f . Roicechkf òauk jufgsc cfc morgkftufg pkak f  (mkfyk` (mkfyk` pkrtcsc). Akrc scfc, acaojcfcsc`kf4 f ` I f ψ f(x ) 9 I χ O` ( x ) 9 ` χ O` ( x ) f f ` 9∝f ` 9∝f akf f ( ` ∝ ;) I f ( ` ∝ ;)χ O` ( x ) I χ O` ( x ) 9 ϟf ( x ) 9 f f ` 9∝f ` 9∝ f Qorechkt ψ f ( x ) ≯ j akf ϟ f ( x ) ≡ j . @krofk ψ f ( x ) ≯ j , ik`k

∛

∛

∛

∠

∛

I f ψf 9 ì( O` ) ≯ cfj ψ . . . . . . . . .(;) ψ ≯ j f ` 9∝ f

∛

∠

@krofk ϟ f ( x ) ≡ j , ik`k

∠

I f ( ` ∝ ;)i( O` ) ≡ sup ϟ . . . . (=) ϟf 9 f ` 9∝ f ϟ ≡ j

∛

∠

@krofk

∠

∠

sup ϟ ≡ cfj ψ ϟ ≡ j

ik`k, akrc (;) akf (=) acporleoh4 ?:

ψ ≯ j

Mkm 1 „ Cftogrke Eomosguo

∠ϟ

f

Nlipceoa my 4 @hkorlfc, ^.^c

≡ sup ∠ ϟ ≡ cfj ∠ ψ ≡ ∠ψ f . ψ ≯ j

ϟ ≡ j

I ⇑ 2 ≡ cfj ψ ∝ sup ϟ ≡ ψ f ∝ ϟf . 9 ψ ≯ j f ϟ ≡ j

∠

∠

∠

∠

f

I f ( ` ∝ ;)i( O` ) ì( O` ) ∝ f ` 9 ∝ f `9∝f

∛

∛

I f .9 ( ` ∝ ( ` ∝ ;)) i( O` ) f ` 9∝ f

∛

I f .9 i( O` ) f ` 9∝ f I .9 i( O ), ∂f f Aofgkf iofgkimce ecict-fyk acporleoh su sup ϟ ∝ cfj ψ 9 2 .

∛

ϟ ≡ j

∠

ψ ≯ j

∠

⇒

∠

∠

Acòtkhuc sup ϟ 9 cfj ψ . K`kf acmu`tc`kf j  jufgsc jufgsc toruùr. Oùcvkeof aofgkf ioimu`tc`kf ϟ ≡ j

ψ ≯ j

kak jufgsc toruùr ψ * sohcfggk j 9 ψ * (ko).

∠

∠

@krofk sup ϟ 9 cfj ψ ik`k ∂f ∈  kak jufgsc soaorhkfk ϟ f akf ψ f sohcfggk4 ϟ ≡ j

ψ ≯ j

;) ϟf ≡ j ≡ ψ f =)

;

∠ψ ∝ ∠ ϟ 5 f f

f

Qorechkt ϟ f fkc` akf ψ f turuf. Acaojcfcsc`kf ϟ 9 sup ϟ f akf ψ * 9 cfj ψ f *

f

f

@krofk @krofk ϟ f ≡ j , ∂f  ik`k ϟ * 9 sup ϟ f ≡ j @krofk j ≡ ψ f , ∂f  ik`k j ≡ supψ f 9 ψ * Dkac, ϟ * ≡ j ≡ ψ * aofgkf ϟ * akf ψ * jufgsc toruùr.

(

)

(

)

ôekfdutfyk, k`kf acmu`tc`kf i {x 4 ϟ * (x ) ≢ ψ * ( x )} 9 i {x 4 ϟ * (x ) 5 ψ * ( x )} 9 2 . Icske,

∊ 9 {x 4 ϟ * ( x ) 5 ψ * ( x )} @krofk ϟ * ( x ) 5 ψ * ( x ) ik`k kak mcekfgkf v ∈  sohcfggk ϟ * ( x ) 5 ψ * ( x ) ∝

; v

Icske ;⎠ ⎧ ∊v 9 ⎨x 4 ϟ * ( x ) 5 ψ * ( x ) ∝ ⎥ v ⎩ ⎣ akf

∊ 9 ∤ ∊v v ∈

Qorechkt ;⎠ ⎧ ;⎠ ⎧ ∊v 9 ⎨x 4 ϟ * ( x ) 5 ψ * ( x ) ∝ ⎥ ⊍ ⎨x 4 ϟf ( x ) 5 ψ f ( x ) ∝ ⎥ 9 ∊v* v⎩ ⎣ v ⎩ ⎣ akf

∠

∊v*

ψ f ∝ ϟ f 6

Dkac, ?7

∠

∊v *

; ; 9 i ( ∊v * ) v v

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

; i ( ∊v* ) 5 v

∠

∠

ψ f ∝ ϟf ≡ *

∊v

ψf ∝

O

∠

O

ϟ f 5

; f

v f

⇝ i ( ∊v * ) 5 , ∂f ⇝ i ( ∊v * ) 9 2 ⇝ i ( ∊ ) 9 2  Aojcfcsc (Cftogrke Jufgsc Qormktks) 4 Icske`kf j  kakekh kakekh jufgsc toruùr akf tormktks ykfg toraojcfcsc pkak hcipufkf O ykfg toruùr aofgkf i( O ) 5 ∖ . Acaojcfcsc`kf Cftogrke Eomosguo akrc j  pkak pkak O somkgkc morcùt4

∠

O

j ( x ) a ( x ) 9 cfj

ψ ≯ j

∠ ψ ( x ) ax O

acikfk ψ kakekh jufgsc soaorhkfk. Aojcfcsc ac ktks mcsk actuecs Fltksc4 ;) j ( x ) a ( x ) 9

∠

O

∠

O

∠

O

j ( x ) a ( x ) 9 sup ϟ ≡ j

∠ ϟ ( x ) ax . O

j

=) Dc`k O 9 P k Y ik`k k, m

∠

O

j 9

∠

m

k

j

>) Dc`k j  kakekh kakekh jufgsc ykfg toruùr akf tormktks sortk j  morfcekc morfcekc fle ac eukr hcipufkf O ykfg toru` oruù ur aof aofgkf gkf i( O ) 5 ∖ , ik`k j 9 j

∠

∠

O

1)

∠

O

j 9

χ ∠ j  χ

O

Humufgkf kftkrk Cftogrke ykfg acaojcfcsc`kf ac ktks aofgkf Cftogrke ]coikff ykfg acaojcfcsc`kf somoeuifyk acmorc`kf akeki prlplscsc morcùt4 Rrlplscsc 4 Icske`kf j  kakekh kakekh jufgsc tormktks ykfg toraojcfcsc pkak P k Y. Dc`k j  torcftogrke`kf torcftogrke`kf ]coikff pkak k, m P k Y ik`k j toruùr akf k, m

]

∠

m

k

j (x ) a (x ) 9

∠

m

j ( x ) a ( x )

k

Mu`tc 4 Icske`kf K 9 `leo`sc jufgsc tkfggk M 9 `leo`sc jufgsc soaorhkfk @krofk j  torcftogrke(`kf) torcftogrke(`kf) ]coikff, ik`k

∠

sup ϟ 9 ] ϟ ∈ K ϟ ≡ j

@krofk K ⊍ M ik`k,

∠

m

k

j 9]

∠

m

k

∠

j 9 cfj ϟ ϟ ∈ K ϟ ≡ j

cfj K ≯ cfj M sup K ≡ sup M

Dkac, ]

∠

m

k

∠

∠

∠

∠

j 9 sup ϟ ≡ sup ϟ ≡ cfj ϟ ≡ cfj ϟ 9 ] ϟ∈ K ϟ ≡ j

ϟ ∈M ϟ ≡ j

@oscipuekf4

?8

ϟ∈M ϟ ≡ j

ϟ ∈ K ϟ ≡ j

∠

m

k

j

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

∠

∠

sup ϟ 9 cfj ϟ , iofurut prlplscsc somoeuifyk j  toruùr toruùr ϟ ∈M ϟ ≡ j

ϟ ∈M ϟ ≡ j

akf,

∠

m

k

∠

j 9 sup ϟ 9 ] ϟ ∈M ϟ ≡ j

∠

m

k

j

 ^cjkt Cftogrke Jufgsc Qoruùr akf Qormktks ^cjkt-scjkt jufgsc toruùr akf tormktks acmorc`kf akeki > prlplscsc morcùt4 Rrlplscsc 4 Icske`kf j  akf akf g  kakekh kakekh jufgsc toruùr, tormktks akf toraojcfcsc pkak hcipufkf toruùr O aofgkf i( O ) 5 ∖ , ik`k4

;.

mg ) 9 k ∠ ∠ ( kj + mg O

∠

j +m

O

∠

=. Dc`k j  9 9 g  (ko) (ko) ik`k

O

>. Dc`k j ≡ g  (ko) ik`k

O

g

j 9

∠

O

∠

O

j ≡

g

∠

O

g  akf k`cmktfyk

1. Dc`k K ≡ j ( x ) ≡ M (ko) ik`k Ki( O ) ≡

∠

O

∠

O

j ≡

∠

j

O

j ≡ Mi( O )

?. Dc`k K akf M kakekh hcipufkf toruùr akf K ∣ M 9 ∏ , aofgkf i( K), i( M ) 5 ∖ ik`k

∠

K ∤ M

j 9

∠

K

j +

∠

M

j

Mu`tc 4 ;. K`kf acmu`tc`kf mkhwk4 c) kj 9 k j

∠ ∠

∠

O

cc)

O

O

j + g 9

Rortkik,

∠

O

∠

O

j +

∠

O

g

∠

j 9 cfj ϟ aofgkf ϟ jufgsc soaorhkfk. ϟ ≯ j

Dc`k k  6 6 2 ik`k

∠

kj 9 cfj

kϟ ≯ kj

∠ kϟ 9 cfj k ∠ ϟ 9 k cfj ∠ ϟ   9 k ∠

j

∠

kj 9 cfj

∠ kϟ 9 cfj k ∠ ϟ 9 k sup ∠ ϟ 9 k ∠

j

O

kϟ ≯ kj

ϟ ≯ j

O

Dc`k k  5 5 2 ik`k O

kϟ ≯ kj

ϟ ≡ j

O

ϟ ≡ j

@oauk, icske`kf jufgsc soaorhkfk 4 ϟ ≡ j  akf akf ψ ≡ g } K 9 {ϟ , ψ  jufgsc jufgsc soaorhkfk 4 j  + + g ≡ ϟ } M 9 {ϟ  jufgsc Ackimce ϟ ,ψ  ∈ ∈ K sohcfggk j + g ≡ ϟ +ψ . Iofggufk`kf scjkt cfjciui akf scjkt cftogrke jufgsc soaorhkfk acporleoh j + g 9 cfj ϟ ≡ ϟ + ψ 9 ϟ + ψ ≡ cfj ϟ + cfj ψ 9 j + g  …… (*)

∠

ϟ ≯ j + g ϟ∈M

O

∠

∠

∠

∠

ϟ≯ j ϟ∈ K

∠

ψ ≯ j ψ ∈ K

∠

∠

∠

O

O

@oiuackf, icske`kf 9 {ϟ , ψ  jufgsc jufgsc soaorhkfk 4 ϟ ≯ j  akf akf ψ ≯ g } N  9 9 {ϟ  jufgsc jufgsc soaorhkfk 4 j  + + g ≯ ϟ } A  9 Ackimce ϟ ,ψ  ∈ ∈ N sohcfggk j + g ≯ ϟ +ψ . Iofggufk`kf scjkt suproiui akf scjkt cftogrke jufgsc soaorhkfk acporleoh j + g 9 sup ϟ ≯ ϟ + ψ 9 ϟ + ψ ≯ sup ϟ + sup ψ 9 j + g  …… (**)

∠

O

ϟ ≡ j + g ϟ∈A

∠

∠

∠

∠

ϟ≡ j ϟ∈N

?3

∠

ψ ≡ j ψ ∈N

∠

∠

O

∠

O

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

Akrc (*) akf (**) acporleoh

∠

j + g 9

∠

j +

Akrc hksce portkik akf òauk cfc, acporleoh kj + mg 9 kj +

∠

mg 9 k

O

∠

∠

O

O

O

O

∠

g

O

∠

O

j +m

∠

O

g

=. @krofk j  9 9 g  (ko) (ko) ik`k j „ g  9 9 2 (ko) Icske`kf ψ   jufgsc soaorhkfk aofgkf ψ ≯ j „ g . @krofk j „ g   9 2 (ko) ik`k ψ ≯ 2 (ko). @krofk ψ ≯ 2, ik`k ψ ≯ 2 . Leoh `krofk ctu,

∠

∠

j ∝ g 9 cfj

ψ ≯ j ∝ g

O

∠ψ ≯ 2

@oiuackf, icske`kf ϟ  jufgsc jufgsc soaorhkfk aofgkf ϟ ≡ j  „ „ g . @krofk j  „ „ g  9 9 2, ik`k ϟ ≡ 2 (ko). @krofk ϟ ≡ 2 ik`k ψ ≡ 2 . Leoh `krofk ctu,

∠

∠

O

∠

j ∝ g 9 sup ψ ≡ 2 ϟ ≡ j ∝ g

Akrc scfc ik`k,

∠

O

j ∝ g 9 2

Aofgkf iofggufk`kf hksce pkak mkgckf ;, acporleoh j ∝ g 9 2 ⇑ j ∝ g 9 2 ⇑

∠

∠

O

∠

O

O

∠

O

j 9

∠

g

O

>. Acòtkhuc j ≡ g (ko) ik`k j ∝ g ≡ 2 (ko). Icske`kf ϟ jufgsc soaorhkfk aofgkf ϟ  ≡ ≡ j ∝ g ≡ 2 ik`k ϟ  ≡ ≡ 2 . @krofk ϟ  ≡ ≡ 2 ik`k

∠ ϟ  ≡ ≡ 2 . Iofurut aojcfcsc O

∠

O

@krofk

j ∝ g 9 sup ϟ ≡ j ∝ g

∠ ϟ O

∠ ϟ  ≡ ≡ 2 ik`k mogctu dugk aofgkf suproiui-fyk akf aofgkf iofggufk`kf hksce O

pkak mkgckf ;, acporleoh

∠

O

j ∝ g ≡ 2 ⇑

∠

@oiuackf, k`kf acmu`tc`kf mkhwk

O

∠

O

j ∝

j ≡

∠

O

∠

O

g ≡2⇑

∠

O

j ≡

∠

g

O

j ktku oùcvkeof aofgkf iofufdu``kf

∝ ∠ j ≡ ∠ j ≡ ∠ j O

O

O

Akrc òfyktkkf mkhwk j ≡ j akf ∝ j ≡ j ik`k iofurut hksce somoeuifyk akf mu`tc pkak mkgckf ; acporleoh j ≡ j akf ∝ j ≡ j ⇑ ∝ j ≡ j

∠

∠

O

∠

O

O

∠

∠

O

O

∠

O

1. @krofk K ≡ j ( x ) ≡ M ik`k iofurut mu`tc pkak mkgckf >, acporleoh

∠ K ≡ ∠ O

O

j (x ) ≡

∠

O

M⇑ K

∠ ;≡ ∠ O

O

j (x ) ≡ M

∠

O

; ⇑ Ki ( O ) ≡

∠

O

j (x ) ≡ Mi ( O )

?. Rortkik, acmu`tc`kf mkhwk dc`k K ∣ M 9 ∏ ik`k χ K∤ M 9 χ K + χ M ⎧; x ∈ K ∤ M χ  K∤ M ( x ) 9 ⎨ ⎣2 x ∃ K ∤ M @ksus C 4 _ftu` x ∈ K ∤ M ik`k χ  K ∤M ( x ) 9 ; . @krofk x ∈ K ∤ M ik`k x ∈ K ktku x ∈ M Acòtkhuc K ∣ M 9 ∏ , sohcfggk dc`k x ∈ K ik`k x ∃ M . K`cmktfyk4 χ K ( x ) + χ M ( x ) 9 ; + 2 9 ; 9 χ K ∤M ( x ) ômkec`fyk, dc`k x ∃ K ik`k x ∈ M . K`cmktfyk4 :2

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

χ K ( x ) + χ M ( x ) 9 2 + ; 9 ; 9 χ K ∤M ( x ) @ksus CC 4 _ftu` x ∃ K ∤ M ik`k χ  K ∤M ( x ) 9 2 . @krofk x ∃ K ∤ M ik`k x ∃ K akf x ∃ M . K`cmktfyk4 χ K ( x ) + χ M ( x ) 9 2 + 2 9 2 9 χ K ∤M ( x ) Dkac tormu`tc χ K ∤M 9 χ K + χ M . ôekfdutfyk, acporhktc`kf mkhwk4

∠

∠ j . χ 9 ∠ j . ( χ + χ ) 9 ∠ j χ + j χ

j 9

K ∤ M

K ∤ M

K

M

K

M

Aofgkf iofggufk`kf hksce pkak mkgckf ;, acporleoh

∠

∠ j χ + ∠ j χ 9 ∠ j + ∠ j

j 9

K ∤ M

K

M

K

M

 Rrlplscsc (Qolroik @o`lfvorgofkf Qormktks) 4 Icske`kf { j f } kakekh mkrcskf jufgsc toruùr ykfg toraojcfcsc pkak hcipufkf toruùr O, aofgkf

i( O ) 5 ∖ . Icske`kf torakpkt I   sohcfggk j f ( x ) ≡ I , ∂f akf ∂x . Dc`k j ( x ) 9 eci j f ( x ) , f ↝∖

∂x ∈ O, ik`k

∠

O

j 9 eci

f ↝∖

∠

O

j f

Mu`tc 4 Ackimce ο 6 2 somkrkfg. Iofurut prcfscp Ectteowlla , uftu` 2 5 ο ; ≡

ο

akf 2 5 α ≡

= i( O )

ο

1 I

torakpkt hcipufkf toruùr

∈  sohcfggk K ⊍ O akf F  ∈ ;. i( K ) 5 α =. j f ( x ) ∝ j ( x ) 5 ο ; , ∂f ≯ F , ∂x ∈ K n Akrc scfc, ik`k

∠

O

j f ∝

∠

O

∠ j ≡ ∠ j 9 ∠ j

j 9

O

O

K

f

∝ j

f

∝ j , O 9 K ∤ K n

f

∝ j +∠

Kn

j f ∝ j

..........................................(;)

@krofk j ( x ) 9 eci j f ( x ) akf j f ( x ) ≡ I , ∂f akf ∂x ik`k j ( x ) ≡ I . ôhcfggk ∂f ∈  f ↝∖

morekù, j f ∝ j ≡ j f + j ≡ I + I 9 = I

...... ......... ...... ...... ...... ...... .......... ...... ...... ...... ...... ...... ...... ...... ...... ...... ...(( =) Dkac, akrc (;), (=), (=), ;, akf = uftu` sotckp f ≯ F  morekù

∠

O

j f ∝

∠

O

j ≡

∠

K

=I +

∠

ο

+

5 = I

1 I

Kn

ο ; 9 = I .i ( K ) + ο ; .i( K n ) 5 = Iα + ο ; .i( O ) ο

= i( O )

i( O ) 9

ο

=

+

ο

=

9 ο 

Rrlplscsc 4 Jufgsc j  tormktks tormktks pkak P k Y, torcftogrke ]coikff ]coikff ⇑ i ({x 4 x tctc` ctc` acs`l cs`lft ftcf cfu u j } ) 9 2 k, m

:;

Mkm 1 „ Cftogrke Eomosguo

1.>.

Nlipceoa my 4 @hkorlfc, ^.^c

Cftogrke Jufgsc Qk` Fogktcj Aojcfcsc (Cftogrke Jufgsc tk` Fogktcj) 4 Icske`kf j  jufgsc jufgsc toruùr tk` fogktcj ykfg toraojcfcsc pkak hcipufkf toruùr O. Acaojcfcsc`kf

∠

O

j 9 sup h ≡ j

∠

h

O

aofgkf h  jufgsc jufgsc toruùr akf tormktks sohcfggk i ( {x 4 h( x ) ≢ 2} ) 5 ∖ . ^cjkt Cftogrke Jufgsc tk` Fogktcj ^cjkt-scjkt cftogrke jufgsc tk` fogktcj acmorc`kf akeki prlplscsc-prlplscsc akf eoiik morcùt4 Rrlplscsc 4 Icske`kf j  akf akf g  kakekh kakekh jufgsc toruùr tk` fogktcj, ik`k

;. =.

∠ ∠

O O

nj 9 n

∠

O

j + g 9

j , n 6 2

∠

O

j +

∠

O

g

>. Dc`k j ≡ g  (ko) ik`k

∠

O

j ≡

∠

O

g

Mu`tc 4 ;. Icske`kf h   jufgsc toruùr akf tormktks sohcfggk i ( {x 4 h( x ) ≢ 2} ) 5 ∖ . Iofurut aojcfcsc,

∠

O

nj 9 sup nh ≡ nj

∠

O

nh 9 sup n h≡ j

∠

O

h 9 n sup

∠

h≡ j

O

∠

h 9n

j

O

=. Ackimce h  akf akf ` jufgsc toruùr akf tormktks sohcfggk h ≡ j akf ` ≡ g . Akrc scfc acporleoh + ` dugk iorupk`kf jufgsc toruùr akf tormktks pkak O. ôhcfggk, h + ` ≡ j + g akf h  +

∠

O

∠

h + ` ≡ sup

h + `≡ j + g

O

h +` 9

∠

O

j +g

⇑ sup h≡ j

∠

O

h + sup `≡ g

∠

O

∠

`≡

O

h+

∠

∠

j + g

O

`≡

∠

O

j +g

⇑

∠

j +

O

∠

g≡

O

O

ôekfdutfyk, ackimce e  jufgsc jufgsc toruùr akf tormktks pkak O aofgkf i ({x 4 e ( x ) ≢ 2} ) 5 ∖ akf e ≡ j + g Acaojcfcsc`kf jufgsc h  akf akf ` aofgkf kturkf h 9 icf( j , e ) akf ` 9 e ∝ h Acporleoh, h ≡ j akf h ≡ e . @krofk e  toruùr toruùr akf tormktks akf h ≡ e ik`k h  toruùr toruùr akf tormktks. _ftu` x ∈ O somkrkfg. Dc`k j ( x ) ≡ e ( x ) ik`k h( x ) 9 j ( x ) . Dkac, `( x ) 9 e ( x ) ∝ h ( x ) 9 e ( x ) ∝ j ( x ) ≡ j ( x ) + g ( x ) ∝ j ( x ) ≡ g ( x ) Dc`k j ( x ) 6 e ( x ) ik`k h( x ) 9 e ( x ) . Dkac, `( x ) 9 e ( x ) ∝ h( x ) 9 e ( x ) ∝ e ( x ) 9 2 ≡ g ( x ) ôhcfggk ` jufgsc toruùr akf tormktks. K`cmktfyk e 9 h + ` 9 h + ` ≡ sup h + sup ` 9 j + g

∠

O

∠

∠

O

∠

O

O

h≡ j

∠

∠

O

`≡ g

∠

O

∠

O

O

akf sup e ≡ j + g

∠

O

e≡

∠

O

e ≡

∠

O

j +

:=

∠

O

g⇑

∠

O

j +g≡

∠

O

j +

∠

O

g

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

Akrc scfc ik`k

∠

j + g 9

O

∠

j +

O

∠

g

O

>. Icske jufgsc toruùr akf tormktks K 9 {h 4 h ≡ j } , h  jufgsc M 9 {h 4 h ≡ g } @krofk

h ∈ K ⇝ h ≡ j ≡ g ⇝ h ≡ g ⇝ h ∈M

ik`k K ⊍ M . Leoh `krofk ctu,

∠

O

∠

h≡

∠

g 9 sup

∠

j ≡

∠

g

j 9 sup

O

h≡ j h∈ K

O

h≡ j h∈M

∠

O

h

Dkac, O

O

 Eoiik Jktlu 4 Icske`kf {j f } ka kakekh mkrcskf jufgsc toruùr tk` fogktcj akf eci eci j f ( x ) 9 j ( x ) hkipcr acikfkf ↝∖

ikfk ac O, ik`k

∠

j ≡ eci

O

∠

O

j f

Mu`tc 4 Ackimce h , jufgsc toruùr akf tormktks pkak O somkrkfg sohcfggk h ≡ j . ⎧ h( x ), j f ( x ) ≯ h( x ) hf ( x ) 9 ⎨ ⎣ j f ( x ), j f ( x ) 5 h( x ) Akrc aojcfcsc cfc, `krofk h  akf akf j f  toruùr ∂f  ik`k ik`k h f  toruùr ∂f . Dugk acporleoh mkhwk akf eci hf 9 h hf ≡ h , ∂f hf ≡ j , ∂f f ↝∖

@krofk h f   tormktks leoh h , ik`k h f   tormktks sorkgki. @krofk h f   tormktks sorkgki leoh h , akf eci hf 9 h  pkak O ik`k ( Qolroik Qolroik @o`lfvorgofkf Qormktks  ) f ↝∖

∠

O

@krofk hf ≡ j f , ∂f  ik`k

∠

O

hf ≡

∠

O

h9

∠

eci hf 9 eci

O f ↝∖

∠

f ↝ ∖ O

j f , ∂f . Akrc scfc, ∂f ,

h f

∠

O

h 9 eci

f ↝∖

∠

O

hf 9 eci

∠

O

hf ≡ eci

∠

O

j f

ôhcfggk,

∠

O

j 9 sup h ≡ j

∠

O

h 9 ec i

∠

O

h f ≡ ec i

∠

O

j f

 Qolroik (@o`lfvorgofkf (@o`lfvorgofkf Ilfltlf)4 Ilfltlf)4 Icske`kf { j f } mkrcskf jufgsc to toruùr tk` fogktcj yk ykfg ilfltlf fkc` ak akf eci j f ( x ) 9 j ( x ) (k.o) f ↝∖

ik`k

∠ j

9 eci ∠ j f

Mu`tc 4 Acòtkhuc { j f } mkrcskf jufgsc toruùr, j f ≯ 2, ∂f , j f  j pkak O. O. K`kf acmu`tc`kf

∠ j

9 eci ∠ j f .

Iofggufk`kf Eoiik Jktlu acporleoh

∠ j :>

≡ eci ∠ j f

Mkm 1 „ Cftogrke Eomosguo

∠

Nlipceoa my 4 @hkorlfc, ^.^c

∠

∠

@krofk eci j f ≡ eci j f , ik`k nuùp acmu`tc`kf eci j f ≡

∠ j

@krofk @krofk j f ≡ j , ∂f  ik`k

∠ j ≡ ∠ j

⇑ eci ∠ j f ≡ ∠ j

f

 K`cmkt 4 Icske`kf {u {u f } mkrcskf jufgsc toruùr tk` fogktcj. Icske`kf ∖

∛ u

j 9

f

f 9;

ik`k ∖

∠ j 9 ∛ ∠ u

f

f 9;

Mu`tc 4 Acaojcfcsc`kf f

∛ u

j f 9

c

c 9;

Qorechkt { j f f } mkrcskf fkc` ilfltlf tk` fogktcj. Akrc scfc ik`k, eci j f 9 eci

f ↝∖

f ↝ ∖

∖

f

∛u 9 ∛u c 9;

c

c 9;

c

9 j

Dkac, eci j f 9 j . Morekù tolroik ò`lfvorgofkf ilfltlf4 f ↝∖

∠ j 9 ∠ eci j f ↝∖

f

f

f

∖

c 9;

c 9;

9 eci ∠ j f 9 eci ∠ ∛ u c 9 eci ∛ ∠ uc 9∛ ∠ u c f ↝∖

f ↝∖

f ↝∖

c 9;

 Rrlplscsc 4 Icske`kf j  jufgsc jufgsc tk` fogktcj akf 5 Oc 6 mkrcskf hcipufkf toruùr ykfg skecfg kscfg. Icske`kf O 9 ∤ Oc . Ik`k

∠

O

Mu`tc 4 Ackimce

j 9

∛∠

Oc

j

u c 9 j .χ Oc

ik`k

∛u

c

9 j .χ O

Aofgkf iofggufk`kf hksce pkak k`cmkt ac ktks, acporleoh

∠

O

j 9

∠ j . χ

O

∖

∖

9 ∛ ∠ j .χ O 9 ∛ ∠ j c 9;

c

c 9;

Oc

 Aojcfcsc 4 Jufgsc toruùr tk` fogktcj j fogktcj j  acsomut acsomut torcftogrke`kf pkak hcipufkf toruùr O toruùr O dc`k dc`k

∠

O

j 5 ∖ .

^cjkt-scjkt jufgsc torcftogrke`kf acmorc`kf pkak auk prlplscsc morcùt Rrlplscsc 4 Icske`kf j   akf g   auk jufgsc toruùr tk` fogktcj. Dc`k j   torcftogrke`kf pkak hcipufkf O O akf pkak O,, ik`k g ik`k g  dugk dugk torcftogrke`kf pkak O pkak O,, akf g ( x ) 5 j ( x ) pkak O :1

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

∠

O

Mu`tc 4 Acòtkhuc j Acòtkhuc j  torcftogrke`kf torcftogrke`kf ik`k j 9

∠

∠

O

∠

j ∝

O

∠ ( j ∝ g)+ g 9 ∠

O

Dkac,

j ∝ g 9

O

∠

O

g

j ∝g+

O

∠

O

g 5 ∖

morkrtc g  torcftogrke`kf torcftogrke`kf pkak O pkak O.. ∠ g  5 5 ∖ , ykfg morkrtc g

j ∝ g 5 ∖ . K`cmktfyk,

O

Dugk,

∠

O

j 9

∠

O

j ∝g+

∠

g⇑

O

∠

O

j ∝

∠

O

g9

∠

O

j ∝ g

 Rrlplscsc 4 Icske`kf j  kakekh kakekh jufgsc tk` fogktcj ykfg torcftogrke`kf pkak O. O. Ik`k uftu` somkrkfg ο 6 2 , torakpkt α 6 2 sohcfggk uftu` sotckp K ⊍ O aofgkf i( K ) 5 α morekù

∠

K

j 5 ο

Mu`tc 4 Ackimce somkrkfg ο 6 2 . Dc`k j Dc`k j tormktks tormktks akf j ≯ 2 ik`k kak I kak I  6 6 2 sohcfggk j ≡ I . ο Rcech α 6 2 aofgkf α 5 I sohcfggk uftu` sotckp K ⊍ O aofgkf i( K ) 5 α morekù

∠

K

j ≡

∠

K

ο I 9 I .i ( K ) 5 I α 5 I  I 5 ο .

Dc`k j Dc`k j  tcak` tcak` tormktks. Acaojcfcsc`kf

j f 9 icf( j , f ), ∂f ∈  Aofgkf pofaojcfcsckf cfc acporleoh mkhwk j f  fkc` akf `lfvorgof ò j , j f ≡ f , ∂f ∈  , soekcf ctu j f ≯ 2 akf j ≯ 2 . Akrc scfc s cfc ik`k, (tolroik ò`lfvorgofkf ilfltlf)

∠

O

@krofk

∠

O

j 9 eci

f ↝∖

∠

O

j 9 eci

f ↝∖

∠

O

j f

j f ik`k uftu` ο 6 2 ac ktks, kak F  ∈ ∈  sohcfggk uftu` f ≯ F  morekù4

∠ j ∝ ∠ O

f

O

j 5 ο = .

Dc`k ackimce f  9 F 9 F ,

∠

K

Ackimce 2 5 α 5

∠

K

∠ 9∠

j 9

K

K

ο = F

j F ∝

∠

K

j 9

∠

K

j ∝

∠

K

j F 5 ο= ⇝

∠

K

j ∝

∠

K

j F 5 ο =

sohcfggk ∂ K ⊍ O aofgkf i( K ) 5 α , ik`k

j ∝ j F + j F j ∝ j F +

5 ο = + ∠ F K

∠

K

j F

( ↛ tormktks leoh F )

5 ο = + F .i ( K ) ο 5 ο= + F . = F 5 ο= + ο = 9 ο

 Nlftlh ^lke (Rrlmeoi 1.:) Icske`kf 5 j f 6 kakekh mkrcskf jufgsc toruùr ykfg tk` fogktcj ykfg `lfvorgof ò j , akf icske`kf uftu` sotckp mcekfgkf ksec f . Mu`tc`kf mkhwk j f ≡ j  uftu`

∠ j

9 eci ∠ j f

:?

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

Dkwkm 4 Ackimce 5 j f 6 mkrcskf jufgsc toruùr akf tk` fogktcj ykfg `lfvorgof ò j   akf uftu` sotckp mcekfgkf ksec f , morekù j morekù j f ≡ j . Aofgkf iofggufk`kf eoiik Jktlu acporleoh (;) j ≡ eci j f ≡ eci j f

∠

∠

∠

@krofk j @krofk j f f tk` fogktcj, akf j akf j f f ≡ j   ik`k j ik`k j   tk` fogktcj. fogktcj. @krofk eci j f 9 j akf j akf j f f toruùr uftu` f ↝∖

sotckp f , ik`k j ik`k j  toruùr. toruùr. K`cmktfyk, aofgkf iofggufk`kf prlplscsc 8, `krofk j f ≡ j  ik`k ik`k j f ≡ j

∠

∠

ôhcfggk aofgkf iofgkimce ecict suporclrfyk acporleoh eci j f ≡ eci j ≡ j

∠

∠

Akrc (;) akf (=) acscipue`kf eci j f ≡ eci j f ≡

∠

∠

(=)

∠

∠ j ≡ eci ∠ j

∠

∠j

f

≡ eci ∠ j f

K`cmktfyk eci j f 9

9 eci ∠ j f

Dkac,

∠ j

9 eci ∠ j f 

1.1.

Cftogrke Eomosguo (Goforke (Goforke Cftogrke Eomosguo )

Icske`kf j Icske`kf j  suktu suktu jufgsc morfcekc roke. Acaojcfcsc`kf j + ( x ) 9 ikx( 2, j ( x )) akf j ∝ ( x ) 9 ikx( 2, ∝ j ( x )) Ik`k, j + , j ∝ ≯ 2 , j 9 j + ∝ j ∝ , akf j 9 j + + j ∝ . ôhcfggk acporleoh | j | + j | j | ∝ j akf j ∝ 9 . j + 9 = = Dc`k j  jufgsc jufgsc toruùr ik`k j + akf j  „  dugk toruùr. Aojcfcsc 4 Jufgsc toruùr j   acsomut torcftogrke`kf pkak O dc`k j + akf j  „   torcftogrke`kf pkak O akf acaojcfcsc`kf

∠

O

j 9

∠

j+∝

O

∠

O

j ∝

Roreu acnktkt mkhwk, jufgsc j   toruùr akf torcftogrke`kf dc`k akf hkfyk dc`k j + akf j  „ torcftogrke`kf. Dkac j  torcftogrke`kf torcftogrke`kf dc`k akf hkfyk dc`k j + 5 ∖ akf j ∝ 5 ∖ .

∠

∠

O

O

^cjkt-scjkt Cftogrke Eomosguo acmorc`kf pkak prlplscsc akf tolroik-tolroik morcùt4 Rrlplscsc 4 Icske`kf j  akf akf g  kakekh kakekh jufgsc torcftogrke`kf pkak O, ik`k4

;. Jufgsc nj  torcftogrke`kf torcftogrke`kf pkak O uftu` sotckp mcekfgkf roke n  akf akf =. Jufgsc j  + + g  torcftogrke`kf torcftogrke`kf pkak O akf >. Dc`k j ≡ g  (ko) ik`k

∠

O

j ≡

∠

O

∠

O

g ::

j + g 9

∠

O

j +

∠

O

g

∠

O

nj 9 n

∠

O

j

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

1. Dc`k K akf M kakekh hcipufkf toruùr akf K ∣ M 9 ∏ , aofgkf K, M ⊍ O ik`k

∠

K ∤ M

j 9

∠

K

j +

∠

M

j

Mu`tc 4 ;. Dc`k n  6 6 2 ik`k ( nj )+ 9 ikx( 2, nj ) 9 n . ikx( 2, j ) 9 nj + ( nj )∝ 9 ikx( 2, ∝nj ) 9 n . ikx( 2, ∝ j ) 9 nj ∝ Iofurut aojcfcsc nj 9 ( nj )+ ∝ ( nj )∝ .

Dkac

∠

O

nj 9

∠ (nj ) ∝ ∠ (nj ) 9 ∠ +

∝

O

O

O

nj + ∝

∠

O

nj

∝

9 n ∠ j + ∝n ∠ j ∝ 9 n O

O

(∠

O

j+∝

∠

O

j

∝

) 9n ∠

O

j

Dc`k n  5 5 2 ik`k ( nj )+ 9 ikx( 2, nj ) 9 ∝n . ikx( 2, ∝ j ) 9 ∝nj ∝ ( nj )∝ 9 ikx( 2, ∝nj ) 9 ∝n . ikx( 2, j ) 9 ∝nj + Iofurut aojcfcsc

∠

O

nj 9

∠ (nj ) ∝ ∠ +

O

O

∠

( nj )∝ 9

O

∝nj ∝ ∝ ∠ ∝nj + 9 ∝n ∠ j ∝ + n ∠ j + 9 n O

∠

@krofk j  torcftogrke`kf, torcftogrke`kf, ik`k

O

O

O

(∠

O

j

+

∝∠ j O

∝

) 9n ∠

O

j

j 5 ∖ . K`cmktfyk

∠

O

nj 9 n

∠

O

j 5 ∖

ykfg morkrtc nj  torcftogrke`kf torcftogrke`kf =. Iofurut aojcfcsc

∠

O

+

+

∠ ( j + g ) + ∠ ( j + g ) +

j + g 9

O

∝

O

+

Rkak akskrfyk ( j + g ) ≢ j + g . ôhcfggk poreu iofggufk`kf mkftukf mu`tc ykfg ekcf. Icske`kf j 9 j ; ∝ j = aofgkf j ; , j = ≯ 2 ik`k j 9 j ; ∝ j = j + ∝ j ∝ 9 j ; ∝ j = j + + j = 9 j ; + j ∝

∠

O

∠ j ∠ j

+

O

∠ +∠ j 9∠ ∝∠ j 9∠ ∠ j 9 ∠

j + + j = 9 =

O

+

O

O

O

∝

O

O

O

O

j ; + j ∝

∠ ∝∠ ∝∠

j; + j; j;

j ∝

O

j =

O

j =

O

Dkac,

∠

O

∠ ( j ∝ j ) + ( g ∝ g ) 9 ∠ ( j + g ) ∝ ( j + g ) 9 ∠ ( j + g ) ∝ ∠ ( j + g ) 9 ∠ j + ∠ g ∝ ∠ j ∝ ∠ g 9 ∠ j ∝ ∠ j + ∠ g ∝ ∠ g 9 ∠ j + ∠ g 5 ∖

j + g 9

+

∝

+

∝

+

+

∝

∝

+

+

O

O

∝

O

O

+

+

O

O

+

:7

∝

O

∝

O

O

∝

O

O

∝

O

+

O

∝

O

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

Dkac j  + + g  torcftogrke`kf. torcftogrke`kf. >. @krofk j ≡ g ik`k g ∝ j ≯ 2 . Aofgkf iofggufk`kf hksce pkak =) acporleoh

∠ g ∝ j 9 ∠ O

g∝

O

∠

O

j ≯2⇑

∠

O

g≯

∠

j

O

1. @krofk K ∣ M 9 ∏ ik`k χ K ∤M 9 χ K + χ M . Dkac,

∠

K ∤ M

j 9

∠ j . χ

9 ∠ j .χ K + ∠ j .χ M 9 ∠ j + ∠ j

K ∤ M

K

M

 Qolroik (Qolroik @o`lfvorgofkf @o`lfvorgofkf Eomosguo) 4 Icske`kf g  jufgsc jufgsc torcftogrke`kf pkak O akf 5 j f 6 mkrcskf jufgsc toruùr soaoic`ckf sohcfggk j f ≡ g pkak O ∂f akf eci j f ( x ) 9 j ( x ) (ko) ac O. Ik`k f ↝∖

∠

j 9 eci

O

∠

O

j f

Mu`tc 4 @krofk j f ≡ g pkak O ∂f ik`k g  ≯ ≯ 2 akf ∝ ≡ j f ≡ g . Dkac, g ∝ j f ≯ 2 akf j f + g ≯ 2 c)

g ∝ j f ≯ 2 , ∂f

eci g ∝ j f 9 g ∝ eci j f 9 g ∝ j

f ↝∖

Eoiik Jktlu j ∝

∠

O

∠

O

g9

∠

O

f ↝ ∖

j ∝ g ≡ ec i

∠

O

g ∝ j f 9 eci

∠

O

g∝

∠

O

∠

jf 9

O

g ∝ eci

∠

O

j f

Dkac,

∝ ∠ j ≡ ∝eci ∠ j f ⇑ ∠ j ≯ eci ∠ j f ………………….. (*) O

O

O

O

cc) j f + g ≯ 2 , ∂f eci j f + g 9 eci j f + g 9 j + g f ↝∖

f ↝ ∖

Eoiik Jktlu

∠

O

j +

∠

g9

∠

j ≡ eci

O

∠

j + g ≡ eci

O

∠

O

j f + g 9 ec i

∠

j f +

O

∠

O

g

Dkac, O

∠

j f ………………….. (**)

O

Akrc (*), (**), akf ec i

∠

O

j f ≡ eci

∠

O

j f

acporleoh eci

∠

O

j f ≡ eci

∠

O

jf ≡

∠

O

j ≡ ec i

∠

O

j f ≡ ec i

∠

O

j f

Dkac,

∠ j O

9 eci ∠ j f 9 eci ∠ j f 9 eci ∠ j f O

O

O

 Qolroik ac ktks iofsykrkt`kf mkhwk mkrcskf 5 j f 6 acalicfksc leoh jufgsc totkp g   ykfg torcftogrke`kf. Qorfyktk, akrc poimu`tckf ac ktks sykrkt cfc tcak` mogctu acporeu`kf. Dc`k `ctk iofggkftc sotckp g  pkak pkak mu`tc ac ktks aofgkf g f  ik`k `ctk iofakpkt`kf poruiuikf akrc Qolroik @o`lfvorgofkf Eomosguo somkgkc morcùt4 Qolroik (Goforke (Goforke Eomosguo Nlfvorgofno Qholroi )4 )4 Icske`kf 5 g f 6 mkrcskf jufgsc torcftogrke`kf ykfg `lfvorgof ò jufgsc torcftogrke`kf g  hkipcr hkipcr acikfk-ikfk. Icske`kf 5 j f 6 mkrcskf jufgsc toruùr soaoic`ckf sohcfggk | j f | ≡ g f  uftu` sotckp f akf 5 j f 6 `lfvorgof ò j  hkipcr hkipcr ac ikfk-ikfk. Dc`k

∠ g 9 eci ∠ g

f

ik`k :8

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

∠ j

9 eci ∠ j f

@krofk | j f | ≡ g f  uftu` sotckp f  ik`k ik`k „ morekù4 g f ≡ j f ≡ g f  uftu` sotckp f . Akrc scfc uftu` sotckp f  morekù4 (c) g f  + j f ≯ 2, akf (cc) g f  „ j f ≯ 2. Doeks g f  + j f akf g f  „ j f  toruùr akf eci ( f » j f ) 9 eci g f » eci j f 9 g » j f ↝∖

f ↝∖

f ↝∖

Aofgkf iofggufk`kf Eoiik Jktlu akf scjkt-scjkt ecict suporclr akf cfjorclr acporleoh ( g + j ) ≡ eci ( g f + j f )

∠

∠

⇑

∠ g + ∠ j 9 ∠ ( g + j ) ≡ ececi ∠ ( g

+ j f ) ≡ ececi ∠ g f + eci ∠ j f 9 ∠ g + eci ∠ j f

f

⇑

∠ j

≡ eci ∠ j f

akf

∠ ( g ∝ j ) ≡ eci ∠ ( g

f

∝ j f )

⇑

∠ g ∝ ∠ j 9 ∠ ( g ∝ j ) ≡ eci ∠ ( g

f

∝ j f ) ≡ eci ∠ g f + eci ∠ ( ∝ j f ) 9 ∠ g ∝ eci ∠ j f

⇑ ∝ ∠ j ≡ ∝eci ∠ j f ⇑ ∠ j ≯ eci ∠ j f Akrc scfc acporleoh,

∠ j ≡ eci ∠ j

akf eci ∠ j f ≡ eci ∠ j f ≡ ∠ j ≡ eci ∠ j f ak

f

ôhcfggk,

∠

∠

eci j f ≡ eci j f ≡

∠j

≡ eci ∠ j f ≡ eci ∠ j f

K`cmktfyk,

∠ j

9 eci ∠ j f 9 eci ∠ j f 9 eci ∠ j f

Nlftlh ^lke (Rrlmeoi 1.;2) Qufdu``kf mkhwk dc`k dc`k j  torcftogrke`kf torcftogrke`kf pkak O, ik`k | j | dugk torcftogrke`kf akf

∠

O

j ≡

∠

j

O

Kpk`kh dugk morekù morekù somkec`fyk< Dkwkm 4 @krofk j  torcftogrke`kf, torcftogrke`kf, ik`k j + akf j  „  dugk torcftogrke`kf. K`cmktfyk | j | 9 j + + j  „  torcftogrke`kf pkak O akf

∠ j O

9

∠

O

j+∝j

∝

9

∠

O

j+∝

∠

O

j∝ ≡

Mkgkcikfk aofgkf somkec`fyk< Dc`k | j | torcftogrke`kf pkak O, ik`k

∠

O

∠

O

j

+

j + ≡

„

+

∠

O

j

∝

9 ∠ j + + ∠ j ∝ 9 ∠ j + + j ∝ 9 ∠ j

∠ | j |5 ∖ O +

O

akf

O

∠

„

O

+

akf j j

∝

+

torcftogrke`kf

9 ikx( 2, j ) 9 j 9 j + + j ∝ :3

∠

O

j ∝ ≡ | j | 5 ∖ . ôhcfggk j +

akf j  dugk torcftogrke`kf pkak O. K`cmktfyk j  9 9 j „ j torcftogrke`kf. Nkrk ekcf 4 j torcftogrke`kf ⇑ j Akrc aojcfcsc,

O

O

Mkm 1 „ Cftogrke Eomosguo

Nlipceoa my 4 @hkorlfc, ^.^c

akf ∝

j

9 ikx( 2, ∝ j ) 9 2

ik`k,

∠

O

j

+

9 ∠ j + + j ∝ 9 ∠ j + + ∠ j ∝ 5 ∖ O

O

akf,

∠

O

Dkac, j

+

akf j

∝

∝

j 9

torcftogrke`kf.

72

∠

O

2925∖

O

Mkm ? Qurufkf akf Cftogrke Rkak mkgckf cfc `ctk ioikfakfg turufkf somkgkc cfvors akrc cftogrke. ônkrk soaorhkfk, `ctk poreu iofdkwkm momorkpk portkfykkf morcùt4 @kpkf`kh m

∠ j '( x ) ax 9 j (m ) ∝ j ( k ) < k

@kpkf`kf a

∠

x

j ( y ) ay 9 j ( x ) < ax k Akrc tolrc cftogrke ]coikff toekh acòtkhuc mkhwk humufgkf òauk k`kf acpofuhc dc`k j  `lftcfu `lftcfu ac x . @ctk poreu iofufdu``kf mkhwk humufgkf cfc sonkrk uiui acpofuhc hkipcr acikfk-ikfk. ôhcfggk turufkf iorupk`kf cfvors/òmkec`kf akrc cftogrke. Rortkfykkf portkik, dkuh eomch suect wkekupuf iofggufk`kf iofggufk`kf Cftogrke Eomosguo, akf morfcekc mofkr mofkr hkfyk uftu` momorkpk momorkpk òeks jufgsc. Rkak Cftogrke ]coikff, turufkf suktu jufgsc ac tctc` tortoftu iorupk`kf òicrcfgkf (grkacof) gkrcs scfggufg ac tctc` torsomut. Rorhktc`kf ceustrksc morcùt4 ( k k ` ( k+h k+h

( k„h k„h

e k„h

_ftu` gkrcs e , i e 9

_ftu` gkrcs `, i ` 9

j ( k + h ) ∝ j ( k ) h j ( k ) ∝ j ( k ∝ h ) h

k

k+h

0 i gkrcs scfggufg ac k 9 eci

j ( k + h ) ∝ j ( k )

h ↝ 2

0 i gkrcs scfggufg ac k 9 eci

h j ( k ) ∝ j ( k ∝ h )

h ↝ 2

h

?.;.

Qurufkf Jufgsc Ilfltlf Ilfltlf Icske`kf ℛ 9 {C ;, . . .} kakekh `leo`sc cftorvke-cftorvke. @leo`sc ℛ acsomut soeciut Zctkec uftu` O dc`k uftu` sotckp ο 6 2 akf kpkpuf x ∈ O , torakpkt cftorvke C  ∈ ∈ ℛ soaoic`ckf sohcfggk x ∈ C akf e ( C ) 5 ο . Cftorvke-cftorvke cfc iufg`cf mu`k, tutup, ktku sotofgkh tutup. Skfg doeks, cftorvke torsomut tcak` mleoh hkfyk toracrc akrc sktu tctc`. Eoiik Zctkec 4 Dc`k ℛ kakekh kakekh soeciu soeciutt Zctkec Zctkec uftu` uftu` O aofgkf aofgkf i * ( O ) 5 ∖ ik`k uftu` sotckp

morhcfggk cftorvke ac ℛ ykfg skecfg eopks {C ;, C =, . . ., C  F } sohcfggk F ⎫ ⎡ i * ⎭ O ~ ∤ C f ⎯ 5 ο f 9; ⎮ ⎪

ο

6 2 kak `leo`sc

Mkm ? „ Qurufkf akf Cftogrke

Nlipceoa my 4 @hkorlfc, ^.^c

Mu`tc4 (soo ‘]oke Kfkeyscs–, H.E. ]lyaof, > ra oa, pkgo 38„33) Akrc Eoiik ac ktks,

⎫

i * ⎭O ~

⎮

⎡ ⎐F ⎖ ⎐ F ⎖ * ( ) * * C f ⎯ 5 ο ⇝ i O ∝ i ⎕ ∤ C f ⎜ 5 ο ⇑ i ⎕ ∤ C f ⎜ 6 i * ( O ) ∝ ο ∤ f 9; ⎪ ⎙ f 9; ⎢ ⎙ f 9; ⎢ F

ôekfdutfyk, akeki tudukf `ctk ioimkhks iofgofkc turufkf (aorcvktcj) akrc suktu jufgsc j , `ctk poreu iofaojcfcsc`kf 1 iknki turufkf akrc jufgsc j  ac ac x  somkgkc somkgkc morcùt4 j ( x + h ) ∝ j ( x ) A + j ( x ) 9 eci+ h ↝ 2 h j ( x + h ) ∝ j ( x ) A+ j ( x ) 9 eci h h ↝ 2+ j ( x ) ∝ j ( x ∝ h ) A ∝ j ( x ) 9 eci+ h ↝ 2 h j ( x ) ∝ j ( x ∝ h ) A∝ j ( x ) 9 eci h h ↝ 2+ + Akrc pofaojcfcsckf ac ktks, doeks mkhwk A j ( x ) ≯ A+ j ( x ) akf A ∝ j ( x ) ≯ A∝ j ( x ) . Dc`k ac`ktk`kf torturuf`kf ( acjjoroftckmeo ) ac x  akf akf `ctk A + j ( x ) 9 A+ j ( x ) 9 A ∝ j ( x ) 9 A∝ j ( x ) ≢ »∖ ik`k j  ac`ktk`kf acjjoroftckmeo iofuecs`kf j– ( (x   ) somkgkc fcekc turufkf j   ac tctc` x . Dc`k A + j ( x ) 9 A+ j ( x ) ik`k j   ac`ktk`kf ioicec`c x turufkf `kfkf ( rcght-hkfa ) ac x   akf iofuecs`kf j– +( x rcght-hkfa aorcvktos x ) somkgkc fcekc turufkf `kfkf j ac x . Aoic`ckf dugk uftu` ykfg ekcf, actuecs`kf j–  „ ( x turufkf `crc j  ac ac x . x ) somkgkc fcekc turufkf Rrlplscsc 4 Dc`k j  `lftcfu `lftcfu pkak P k Y akf skekh sktu turufkffyk tk` fogktcj pkak ( k ) ik`k j  kakekh kakekh jufgsc k, m k, m tk` turuf pkak P k Y k, m Mu`tc 4 Icske`kf j  `lftcfu `lftcfu pkak P k Y akf skekh sktu turufkffyk, turufkffyk, `ktk`kf A+ j ( x ) ≯ 2, ∂x ∈ ( k, m ) . k, m Akrc aojcfcsc, j ( x + h ) ∝ j ( x ) j ( x + h ) ∝ j ( x ) 9 sup cfj A+ j ( x ) 9 eci 2 5h 5α   h h h ↝ 2 + α  6 2 @krofk A+ j ( x ) ≯ 2, ∂x ∈ ( k , m )   ik`k j ( x + h ) ∝ j ( x ) cfj ≯2 2 5h 5α   h @krofk h  6 6 2, ik`k hkrusekh j ( x + h ) ∝ j ( x ) ≯ 2 j ( x + h ) ≯ j ( x )

Dkac, uftu` sotckp x ≡ x  + + h  morekù morekù

j ( x ) ≡ j ( x + h )

Mu`tc ekcf4 Icske`kf j   `lftcfu pkak P k Y akf skekh sktu turufkffyk, `ktk`kf A + j ( x ) ≯ 2, ∂x ∈( k , m ) . k, m Ackimce somkrkfg x ∈ ( k , m ) . Akrc aojcfcsc, j ( x + h ) ∝ j ( x ) A + j ( x ) 9 eci+ ≯2 h ↝ 2 h Ackimce y  9 9 x  + + h , acporleoh h 9 y ∝ x akf dc`k h ↝ 2 + ik`k ∝ x 6 2 ⇑ y 6 x . Ik`k,

⎐

cfj ⎕ sup α  6 2

j ( y ) ∝ j ( x ) ⎖

⎙ x 5 y 5 x +α   7=

y ∝ x

⎜≯2 ⎢

Mkm ? „ Qurufkf akf Cftogrke

Dkac, uftu` sotckp

Nlipceoa my 4 @hkorlfc, ^.^c

x 5 y 5 x + α   sohcfggk j ( y ) ∝ j ( x ) ≯ 2 ⇝ j ( y ) ∝ j ( x ) ≯ 2 ⇝ j ( x ) ≡ j ( y ) y ∝ x

α   6 2 kak

Nlftlh ^lke (Rrlmeoi ?.;) 4 Icske`kf j jufgsc ykfg acaojcfcsc`kf aofgkf j (2) (2) 9 2 akf j ( ( x ) uftu` x ≢ 2. x ) 9 x scf(;/x + „ Qoftu`kf A  j (2), (2), A + j (2), (2), A  j (2), (2), A  „  j (2) (2) Dkwkm 4 Rortkik, poreu actufdu``kf mkhwk ecict-fyk kak. Acgufk`kf prcfscp kpct4 x ↝ 2 + , x ≢ 2

∝; ≡ scf ( x ; ) ≡ ; ∝x ≡ x .scf ( x ; ) ≡ x @krofk eci+ ( ∝x ) 9 2 akf eci+ x 9 2 ik`k eci+ x . scf ( x ; ) 9 2 . x ↝2

x ↝ 2

x ↝2

x ↝ 2 ∝ , x ≢ 2

∝; ≡ scf ( x ; ) ≡ ; ∝x ≯ x .scf ( x ; ) ≯ x @krofk eci∝ ( ∝x ) 9 2 akf eci∝ x 9 2 ik`k eci∝ x . scf ( x ; ) 9 2 . x ↝2

x ↝ 2

x ↝2

Dkac, eci x . scf ( x; ) 9 eci∝ x . scf ( x; ) 9 eci x . scf ( x ; ) 9 j ( 2 ) 9 2

x ↝2 +

ôekfdutfyk, ackimce soimkrkfg

x ↝2

x ↝2

α   6

2.

2 5 h 5 α   ⇝

; ; 6 h α

⎐ ⎐ ; ⎖⎖ ⎐ ;⎖ Ik`k sup ⎕ scf ⎜ 9 ; . K`cmktfyk cfj ⎕ sup ⎕ scf ⎜ ⎜ 9 ; . Akrc hksce cfc acporleoh, ⎙ h ⎢ ⎙ ⎙ h ⎢ ⎢ h . scf( h ; ) j ( 2 + h ) ∝ j ( 2 ) + e ci+ 9 eci+ 9 eci+ scf ( h ; ) 9 ; A j ( 2 ) 9 ec h ↝2 h ↝2 h ↝2 h h h . scf( h ; ) j ( 2 + h ) ∝ j ( 2 ) A+ j ( 2 ) 9 ececi 9 eci 9 eci scf ( h ; ) 9 ∝; + + h h h ↝2 h ↝2 h ↝2 + j ( 2 ) ∝ j ( 2 ∝ h ) h . scf( ∝;h ) ∝ A j ( 2 ) 9 ececi+ 9 eci+ 9 eci+ scf ( ∝;h ) 9 ; h ↝2 h ↝2 h ↝2 h h ; h . scf( ∝ h ) j ( 2 ) ∝ j ( 2 ∝ h ) 9 ec i 9 eci scf ( ∝;h ) 9 ∝; A∝ j ( 2 ) 9 ececi + + h h h ↝2 h ↝2 h ↝2 + Nlftlh ^lke (Rrlmeoi ?.=) 4 k. Qufdu``kf mkhwk mkhwk A +P„ ( x (x   ) j ( x )Y 9 „ A A+  j ( x + m. Dc`k g ( (x   ) 9 j („ („ x ( x („ x x x ), ik`k A  g ( x ) 9 „ A A „   j („ x ) Dkwkm 4 P ∝ j ( x + h )Y ∝ P ∝ j ( x )Y k. A + P ∝ j ( x )Y 9 eci+ h ↝2 h j ( x + h ) ∝ j ( x ) ⎐ j ( x + h ) ∝ j ( x ) ⎖ + 9 ∝ ec i 9 ∝A+ j ( x ) A P ∝ j ( x )Y 9 eci+ ∝ ⎕ ⎜ h ↝ 2 h h h ↝2 + ⎙ ⎢ g ( x + h ) ∝ g (x ) m. A + g ( x ) 9 eci+ h ↝ 2 h

7>

Mkm ? „ Qurufkf akf Cftogrke + A j ( x  ) 9 eci+

Nlipceoa my 4 @hkorlfc, ^.^c

j ( ∝x ∝ h ) ∝ j ( ∝ x )

h ↝2

9 eci+ ∝

j ( ∝x ) ∝ j ( ∝x ∝ h )

h ↝2

h

h

9 ∝ ec i

j ( ∝ x ) ∝ j ( ∝ x ∝ h ) h

h ↝2 +

9 ∝ A ∝ j ( ∝x ) Qolroik 4 Dc`k j  jufgsc jufgsc fkc` akf morfcekc roke pkak P k Y ik`k j  torturuf`kf torturuf`kf hkipcr ac ikfk-ikfk akf k, m m

∠ j '( x ) a ( x ) ≡ j (m ) ∝ j ( k ) k

Mu`tc 4 (Mu`tcfyk kak ;2 `ksus) Rortkik, k`kf acmu`tc`kf mkhwk A + j ( x ) 9 A+ j ( x ) 9 A ∝ j ( x ) 9 A∝ j ( x ) . K`kf acmu`tc`kf uftu` sktu `ksus, icske`kf A + j ( x ) 9 A∝ j ( x ) hkipcr acikfk-ikfk. Hke cfc oùcvkeof aofgkf

(

)

ioimu`tc`kf i * {x 4 A + j ( x ) 6 A∝ j ( x ) } 9 2 . Icske`kf O 9 {x ∈P k , m Y 4 A + j ( x ) 6 A∝ j ( x )}

Aofgkf iofggufk`kf k`sclik Krnhcioaos, O akpkt actuecs somkgkc O 9 {x ∈P k , m Y 4 A + j ( x ) 6 u 6 v 6 A∝ j ( x )}

∤

u , v ∈

Icske`kf, uftu` suktu u , v Ou ,v 9 {x ∈P k , m Y 4 A + j ( x ) 6 u 6 v 6 A∝ j ( x )} ik`k,

∤O

O 9

u ,v

u ,v ∃

Dkac, nuùp acmu`tc`kf acmu`tc`kf i * ( Ou ,v ) 9 s 9 2 . Akrc A + j ( x ) 6 u 6 v 6 A∝ j ( x )  actcfdku `ksus morcùt c)

∂x ∈ Ou ,v ⇝ A∝ j ( x ) 5 v j ( x ) ∝ j ( x ∝ h )

5 v h @krofk suproiui, ik`k kak h  nuùp nuùp ònce sohcfggk pkak P x „ h , h Y morekù j ( x ) ∝ j ( x ∝ h ) (;) 5 v ⇝ j ( x ) ∝ j ( x ∝ h ) 5 vh ……………………. h @krofk i * ( Ou ,v ) 5 ∖ ik`k kak hcipufkf tormu`k L sohcfggk Ou ,v ⊍ L akf eci

h ↝2 +

i * (L ) 5 s + ο

@krofk i * ( Ou ,v ) 5 ∖ ik`k iofurut Eoiik Zctkec, kak `leo`sc morhcfggk cftorvke { C ;, C =, …, C  F } ykfg skecfg eopks akf K ⊍ Ou ,v sohcfggk

∤

k) K ⊍ C f m) i * ( K ) 6 s ∝ ο Icske`kf C f 9 P x f ∝ hf , x f Y , f 9 ;, ;, =, ..., F Akrc (;), j ( x f ) ∝ j ( x f ∝ hf ) 5 vh f . ôhcfggk F

F

F

∛ j ( x ) ∝ j ( x ∝ h ) 5 ∛ vh 9 v ∛ h @krofk ∤ C ⊍ L ik`k i ( ∤ C ) ≡ ∛ e ( C ) 9 ∛ h 5 i( L ) . Dkac, ∛ j ( x ) ∝ j ( x ∝ h ) 5 vi(L ) 5 v( s + ο ) ……………………(=) f

f 9;

f

f

f

f

F

f 9;

f

f

f

71

f

f 9; f

f

f 9;

f

Mkm ? „ Qurufkf akf Cftogrke

Nlipceoa my 4 @hkorlfc, ^.^c

cc) ∂x ∈ K ⇝ A + j ( x ) 6 u j ( x + h ) ∝ j ( x )

6 u h @krofk cfjciui, ik`k kak h  nuùp nuùp ònce sohcfggk pkak P x Y morekù x, x + h j ( x + h ) ∝ j ( x ) (>) 6 u ⇝ j ( x + h ) ∝ j ( x ) 6 uh ……………………. h @krofk i * ( K ) 5 ∖ ik`k iofurut Eoiik Zctkec, kak `leo`sc morhcfggk cftorvke { D ;, D =, …, D  I } ykfg skecfg eopks akf M ⊍ K sohcfggk eci+

h ↝2

k) M ⊍

I

∤ D

c

c 9;

m) i * ( M ) 6 s ∝ =ο D c ⊍ C f n) @krofk x ∈ M ⇝ x ∈ D c uftu` suktu c ⇑ x ∈ K ⇝ x ∈ C f uftu` suktu f ik`k

9 P y f , y f + ` f Y , f 9 ;, =, ..., I Akrc (>), j ( y f + `f ) ∝ j ( y f ) 6 u`f . ôhcfggk Icske`kf

f

I

∛ j ( y f 9;

f

I

I

f 9;

f 9;

+ `f ) ∝ j ( y f ) 6 ∛ u`f 9 v ∛ `f 6 u ( s ∝ =ο ) ……………(1)

ô`krkfg, icske`kf D ; , D = , D > ⊍ C ;

x;  ) „ j ( x ( x (x ; +h ; )

D =

;

x ; „ h; „ h

=

D > y >

y 1

x ; C ;

Dkac, u( s ∝ =ο ) 5

I

∛ j( y f 9;

f

+ `f ) ∝ j ( y f )

F

≡ ∛ j ( x f ) ∝ j ( x f ∝ h f ) f 9;

≡ v ( s + ο ),

∂ο 6 2

Ik`k, u ( s ∝ = f; ) ≡ v ( s + f ; ),

∂f ∈ 

us ≡ vs

( u ∝ v )s ≡ 2 @krofk u  „ „ v  6 6 2, ik`k s ≡ 2. Rkakhke s ≯ 2. Dkac hkrusekh s  9 9 2. @oauk, k`kf acmu`tc`kf mkhwk

m

∠ j '( x ) a ( x ) ≡ j ( m ) ∝ j ( k ) . k

Icske`kf g ( x ) 9 eci h ↝ 2

j ( x + h ) ∝ j ( x ) h

Acaojcfcsc`kf 7?

9 j '( x ) toraojcfcsc (ko)

Mkm ? „ Qurufkf akf Cftogrke

Nlipceoa my 4 @hkorlfc, ^.^c

j ( x + f ; ) ∝ j ( x )

g f ( x ) 9

akf j ( x ) 9 j ( m ) uftu` x  6 6 m

; f

Dkac, eci g f 9 g  (ko) akf `krofk j  jufgsc jufgsc fkc` ik`k g f ≯ 2. Eoiik Jktlu, f ↝∖

∠

m

k

∠

j ' 9

m

k

g ≡ eci

∠

m

f ↝∖ k

g f . 9 eci f f ↝ ∖

∠

m

j ( x + f ; ) ∝ j ( x )

k

(∠ . 9 eci f ( ∠ . 9 eci f ( ∠ . 9 eci f ( ∠ . 9 eci f f ↝∖

m

k

j ( x + f ; ) ∝

; m + f

j (x )∝

; k + f

f ↝∖

m

j (x ) +

k + f;

f ↝∖

f ↝∖

m + f;

j (x )∝

m

∠

∠

k

j (x )

m + f;

j (x ) ∝

m

∠

)

j (x )

)

m

k

∠

m

; k + f

k

∠

; k + f

k

j (x ) ∝

∠

m

; k + f

)

j (x )

)

j (x )

@krofk j  jufgsc jufgsc fkc`, ik`k ∂x ∈P k , k + f ; Y morekù j ( k ) ≡ j ( x ) ⇑ ∝ j ( x ) ≡ ∝ j ( k ) . K`cmktfyk

∠ j ' ≡ eecci f ( ∠ m

k

f ↝∖

m + f;

m

j (m ) ∝

∠

; k + f

k

)

j ( k ) 9 eci f ( j ( m ).( m + f; ∝ m ) ∝ j ( k ).( k + f ; ∝ k ) ) 9 j ( m ) ∝ j ( k ) f ↝ ∖

?.=.

Jufgsc Morvkrcksc Qormktks Icske`kf j  jufgsc jufgsc morfcekc roke ykfg acaojcfcsc`kf pkak cftorvke P k Y akf icske`kf k  9 9 x 2 5 x ; 5 . k, m . . 5 x ` 9 m  iorupk`kf iorupk`kf somkrkfg pkrtcsc akrc P k Y. Acaojcfcsc`kf k, m p 9

`

∛ P j ( x ) ∝ j ( x c 9;

f9

`

∛P j ( x ) ∝ j ( x c

c 9;

t 9 p+f 9

`

∛

+

c ∝;

c

)Y

∝

)Y

c ∝;

j ( x c ) ∝ j ( x c ∝ ; )

c 9;

acik acikfk fk r + 9 ikx(2, kx(2, r ) , r ∝ 9 ikx( 2, ∝r ) , a akkf |r |9 r + + r ∝ . Akrc pofaojcfcsckf cfc acporleoh, p ∝ f 9

`

∛P j ( x ) ∝ j ( x c

c 9;

+

c ∝;

)Y ∝

`

∛ P j ( x ) ∝ j ( x c 9;

c

c ∝;

∝

)Y

`

9 ∛ j ( x c ) ∝ j ( x c ∝; ) c 9;

9 j ( x ` ) ∝ j ( x 2 ) 9 j (m ) ∝ j ( k ) @oiuackf, acaojcfcsc`kf 9 sup p, R  9 9 sup f , F  9 9 sup t , Q  9 ykctu iofgkimce suproiui akrc soiuk pkrtcsc-pkrtcsc ykfg iufg`cf pkak P k , m Y. @krofk, p 9

`

∛P j ( x ) ∝ j ( x c 9;

ik`k,

c

+

c ∝;

)Y ≡

`

∛ c 9;

j ( x c ) ∝ j ( x c ∝; ) 9 t

sup p ≡ sup t 9 sup( f + p ) ≡ sup p + sup f

K`cmktfyk

R ≡Q ≡R +F ikscfg-ikscfg acsomut plsctcj, fogktcj, akf vkrcksc tltke akrc j  pkak pkak P k Y. Zkrcksc tltke akrc j R , F , akf Q  ikscfg-ikscfg k, m 7:

Mkm ? „ Qurufkf akf Cftogrke

Nlipceoa my 4 @hkorlfc, ^.^c

pkak P k Y actuecs Qk m ( j ) ktku Q k m . k, m Nlftlh 4 Dc`k j  jufgsc jufgsc toruùr akf fkc` ilfltlf pkak P k Y, ik`k k, m p 9

`

∛P j ( x ) ∝ j ( x c

c 9;

f9

c

c 9;

t9

c ∝;

`

∛P j (x ) ∝ j ( x `

∛ c 9;

`

∛ j (x ) ∝ j (x

+

)Y 9

c

c 9;

∝

)Y 9

c ∝;

j ( x c ) ∝ j ( x c ∝; ) 9

c ∝;

) 9 j ( x ; ) ∝ j ( x 2 )... + j ( x ` ) ∝ j ( x `∝; ) 9 j ( m ) ∝ j ( k )

`

∛2 9 2 c 9;

`

∛ j (x ) ∝ j (x c 9;

c

c ∝;

) 9 j ( m ) ∝ j ( k )

9 sup t  9 9 j ( (m (k Q  9 m  ) „ j ( k  ) 9 sup f  9 9 2 F  9 9 sup p 9 j ( (m (k R  9 m  ) „ j ( k  ) 9 F  + + R Q  9 Aojcfcsc (Jufgsc Morvkrcksc Qormktks)4 Jufgsc j  ac`ktk`kf ac`ktk`kf morvkrcksc tormktks pkak P k Y dc`k Q k m 5 ∖ akf acfltksc`kf aofgkf j ∈ MZ . k, m Eoiik 4 Dc`k j  morvkrcksc morvkrcksc tormktks pkak P k Y ik`k k, m Qkm 9 Rkm + F k m

akf j ( m ) ∝ j ( k ) 9 Rkm ∝ F k m

Mu`tc 4 Ackimce somkrkfg pkrtcsc pkak Pk, mY. Iofurut aojcfcsc, p ∝ f 9 j ( m ) ∝ j ( k ) ⇑ p 9 f + j ( m ) ∝ j ( k ) Akrc scfc, ik`k sup p 9 sup( f + j ( m ) ∝ j ( k )) 9 sup f + j ( m ) ∝ j ( k )

⇑ R 9 F + j (m ) ∝ j ( k ) ⇑ R ∝ F 9 j (m ) ∝ j ( k ) Dugk, t 9 p + f 9 p + p ∝ { j ( m ) ∝ j ( k )}

Ik`k, sup t 9 sup( p + p ∝ { j ( m ) ∝ j ( k )} ) 9 sup = p ∝ { j ( m ) ∝ j ( k )}

⇑ Q 9 =R ∝ { j (m ) ∝ j ( k )} ⇑ Q 9 =R ∝ R + F 9 R + F Qolroik 4 Jufgsc j   morvkrcksc tormktks pkak P k Y dc`k akf hkfyk dc`k j   iorupk`kf soecsch auk jufgsc k, m ilfltlf akf morfcekc roke pkak P k Y k, m Mu`tc 4 ⇝ ) Acòtkhuc j ∈ MZ . K`kf acmu`tc`kf mkhwk j 9 g ∝ h  aofgkf g akf h jufgsc ilfltlf.

@krofk j ∈ MZ ik`k Qk m ( j ) 5 ∖ . Akrc Eoiik ac ktks, j ( x ) 9 Rkx ∝ F k x + j ( k )

Ackimce 77

Mkm ? „ Qurufkf akf Cftogrke

Nlipceoa my 4 @hkorlfc, ^.^c

g ( x ) 9 R k x akf h( x ) 9 F k x

Qorechkt mkhwk, ∂x 5 y ⇝ Rkx ≡ Rk y   ykfg morkrtc g ( x ) 9 R k x tk` turuf0 akf ykfg mor morkrtc krtc h( x ) 9 F k x tk` turuf ∂x 5 y ⇝ F kx ≡ F k y   ykfg 9 g  „ „ h  aofgkf aofgkf g  akf akf h  jufgsc jufgsc ilfltlf. K`kf acmu`tc`kf j ∈ MZ ⇑ Q k m 5 ∖ ⇒ ) Acòtkhuc j  9 t km ( j ) 9

`

∛

j ( x c ) ∝ j ( x c ∝ ; )

c 9; `

9 ∛ ( g ( x c ) ∝ h( x c ) ) ∝ ( g ( x c ∝; ) + h( x c ∝; ) ) c 9; `

`

c 9;

c 9;

≡ ∛ g ( x c ) ∝ g ( x c ∝; ) + ∛ h( x c ) + h( x c ∝; )

@krofk g ( (x   ) akf h ( (x   ) jufgsc ilfltlf, ilfltlf, ik`k x x t k m ( j ) ≡ g ( m ) ∝ g ( k ) + h( m ) ∝ h( k ) Akrc scfc ik`k, Qk m ( j ) ≡ g ( m ) ∝ g ( k ) + h( m ) ∝ h( k ) 5 ∖ Dkac, j ∈ MZ K`cmkt 4 Dc`k j  jufgsc jufgsc morvkrcksc tormktks pkak P k Y ik`k j– ( (x   ) kak hkipcr ac ac ikfk-ikfk pkak P k Y k, m x k, m Mu`tc 4 jufgsc ilfltlf ilfltlf j ∈ MZ . ⇝ j 9 g ∝ h , g akf h jufgsc

. ⇝ j ' 9 ( g ∝ h ) ' 9 g ' ∝ h ' (tolroik turufkf jufgsc ilfltlf ) Dkac, j–  kak kak (ko) pkak P k Y. k, m ?.>.

Qurufkf Cftogrke Cftogrke Dc`k j  jufgsc jufgsc torcftogrke`kf pkak P k Y acaojcfcsc`kf cfaojcfct cftogrke (cftogrke tk` toftu) akrc j k, m ykctu J  ykfg ykfg acaojcfcsc`kf pkak P k Y aofgkf kturkf k, m J(x ) 9

∠

m

k

j ( t ) at

Akeki sum-mkm cfc `ctk k`kf ioechkt mkgkcikfk turufkf akrc cfaojcfct cftogrke akrc suktu jufgsc torcftogrke`kf kakekh skik aofgkf cftogrkefyk hkipcr acikfk-ikfk. @ctk iuekc poimkhkskf cfc aofgkf ioechkt momorkpk eoiik. Eoiik 4 Dc`k j  torcftogrke`kf torcftogrke`kf pkak P k Y ik`k jufgsc J  aofgkf aofgkf k, m J(x ) 9

∠

m

k

j ( t ) at

kakekh jufgsc `lftcfu akf morvkrcksc tormktks pkak P k , m Y. Mu`tc 4 Kimce somkrkfg n ∈P k , m Y . K`kf acmu`tc`kf J   `lftcfu ac n . Oùcvkeof aofgkf ioimu`tc`kf ∂ο 6 2, ∎α   6 2 sohcfggk | x ∝ n |5 α ⇝ j ( x ) ∝ j ( n ) 5 ο . Ackimce somkrkfg ο 6 2 . @krofk j  torcftogrke`kf torcftogrke`kf pkak P k Y ik`k | j | torcftogrke`kf pkak P k Y k, m k, m @krofk | j | ≯ 2 akf torcftogrke`kf pkak P k Y ik`k kak α  6 2 sohc sohcfg fggk gk uftu uftu`` sotc sotckp kp K ⊍ P k , m Y k, m aofgkf i( K ) 5 α   ik`k

∠ | j |5 ο . K

Kimce K 9 {x ∈P k , m Y4 Y 4| x ∝ n |5 α  / >} 78

Mkm ? „ Qurufkf akf Cftogrke

„ α   n α/>

Nlipceoa my 4 @hkorlfc, ^.^c

n +α  />

n

n 9k

n +α  />

n„ α   α/>

n9m

Dkac, sonkrk uiui i( K ) ≡

= >

α

5 α  . ôhcfggk

| x ∝ n |5 α ⇝ J ( x ) ∝ J ( n ) 9

∠

x

k

j (t ) ∝

∠

n

j (t ) 9

k

∠

n

x

j (t ) ≡

∠

n

x

j (t ) 5

∠

K

j ( t ) 5 ο

ôekfdutfyk, k`kf acmu`tc`kf j ∈ MZ . Oùcvk Oùcvkeof eof aofgkf aofgkf ioimu` ioimu`tc` tc`kf kf Qk m ( J ) 5 ∖ t km ( J ) 9

`

∛ J(x ) ∝ J(x

)

c ∝;

c

c 9` `

9 ∛ ∠ j ( t ) ∝ ∠ c 9` `

xc

x c ∝;

k

k

j ( t )

9 ∛ ∠ j ( t ) x c

x c ∝;

c 9` `

≡ ∛∠ c 9`

xc

x c ∝;

j ( t ) 9

∠

x;

x2

j (t ) +

∠

x=

x;

j ( t ) + ... +

∠

x`

x ` ∝;

j (t ) 9

∠

m

k

j ( t )

@krofk j   torcftogrke`kf ik`k | j | torcftogrke`kf. @krofk ruks `kfkf tcak` morgkftufg pkak pkrtcsc, ik`k Qkm ( J ) 9 sup t k m ( J ) ≡

ôekfdutfyk, aofgkf iofaojcfcsc`kf J ( x ) 9

∠

m

k

∠

m

k

j ( t ) 5 ∖

j ( t ) at , ∂x ∈P k , m Y torfyktk acporleoh mkhwk

jufgsc J  `lftcfu `lftcfu akf morvkrcksc tormktks pkak P k Y. @ctk k`kf ioechkt mkhwk J  ioipufykc ioipufykc turufkf. k, m Krtcfyk J– ( ( x morekù4 x ) kak. ôhcfggk dugk morekù4 a m ;) J '( x ) 9 j ( t ) at 9 j ( x ) ax k

∠

=)

m

∠ j (t ) at 9 j (m ) ∝ j ( k ) k

_ftu` ctu, `ctk poreu iofcfdku momorkpk eoiik morcùt4 Eoiik 4 Dc`k j  torcftogrke`kf torcftogrke`kf pkak P k Y akf k, m

∠

x

k

j ( t ) at 9 2 , ∂x ∈P k , m Y

ik`k j ( ( ) t Y. t 9 2 (ko) ac P k k, m Mu`tc 4 (soo ‘]oke Kfkeyscs–, H.E. ]lyaof, > ra oa, pkgo ;2?-;2:). Eoiik 4 Dc`k j  jufgsc jufgsc tormktks akf toruùr pkak P k Y akf k, m J(x ) 9

∠

x

k

j ( t ) at + J ( k )

ik`k J– ( (x   ) 9 j ( ( x Y. x x ) (ko) pkak P k k, m Mu`tc 4 (soo ‘]oke Kfkeyscs–, H.E. ]lyaof, > ra oa, pkgo ;2:-;27). Qolroik 4 Dc`k j  jufgsc jufgsc torcftogrke`kf pkak P k Y akf k, m 73

Mkm ? „ Qurufkf akf Cftogrke

Nlipceoa my 4 @hkorlfc, ^.^c

J(x ) 9

x

∠

j ( t ) at + J ( k )

k

ik`k J– ( (x   ) 9 j ( ( x Y. x x ) (ko) pkak P k k, m Mu`tc 4 Acòtkhuc j  torcftogrke`kf torcftogrke`kf pkak P k Y akf J ( x ) 9 k, m

∠

Akrc auk eoiik ac ktks, nuùp acmu`tc`kf

x

∠

x

k

(x   ) 9 j ( ( x j ( t ) at + J ( k ) . K`kf acmu`tc`kf J– ( x x )

J '( t ) at 9

k

∠

x

k

j ( t ) at , ∂x ∈P k , m Y .

@krofk j  9 9 j + „ j  „  aofgkf j +, j  „ ≯ 2 (tkfpk iofgurkfgc òuiuikf mu`tc) ik`k j ≯ 2. Acaojcfcsc`kf mkrcskf { j f } somkgkc morcùt4 ⎧ j ( x ),), j ( x ) 5 f j f ( x ) 9 ⎨ j (x ) ≯ f ⎣ f, Akrc pofaojcfcsckf cfc acporleoh j f ≯ 2 , ∂f ∈  0 j f  j 0 j f ≡ f , ∂f ∈  akf j f  tormktks akf toruùr. Iofurut eoiik òauk ac ktks, ik`k a x j f ( t ) at 9 j f ( x ) , ∂f ∈  ax k @oiuackf acaojcfcsc`kf ∂f ∈  Gf 9 j ∝ j f ≯ 2 ôhcfggk,

∠

x5 y⇝

∠

x

k

∠

j ∝ jf ≡

x

k

j f ∝ j ⇑ Gf ( x ) ≡ Gf ( y )

Dkac Gf  ilfltlf tk` turuf. K`cmktfyk ; Gf ' ( x ) ≯ 2 , ∂x ∈ ( k , m ) . Akrc hcpltoscs a x J '( x ) 9 j f ( t ) at ax k a x 9 ( j ∝ j f ) + j f ax k a x a x j ∝ j f ) + j f 9 ( ax k ax k   9 Gf' ( x ) + j f ( x )

∠ ∠

∠

∠

≯ 2 + j f ( x ) 9 j f ( x ), ∂f Dkac,

), ∂x ∈P k , m Y, ∂f ⇑ j f ≡ J ', ∂f ⇑ eci j f ≡ J ' ⇑ j ≡ J ' j f ( x ) ≡ J '( x ), f ↝∖

Akrc hcpltoscs acporleoh J ( x ) ∝ J (k ) 9

@krofk j ≯ 2 ik`k

∠

x

k

j ≡

∠

x

k

J '   ……………………… (;)

x5 y⇝

∠

x

k

j ≡

∠

y

k

j

Dkac J  tk` tk` turuf, k`cmktfyk

∠

x

k

J ' ≡ J ( x ) ∝ J (k ) 9

∠

x

k

Akrc (;) akf (=) acporleoh

; Echkt

prlplscsc ac hkekikf 7=. 82

(=) j ………………………

Mkm ? „ Qurufkf akf Cftogrke

Nlipceoa my 4 @hkorlfc, ^.^c

∠

x

k

j ( t ) at 9

∠

x

k

J '(t ) at 9 J ( x ) ∝ J (k )

K`cmktfyk,

∠

x

k

j ( t ) at ∝

∠

x

k

J '(t ) at 9 2 ⇑

∠

x

k

P j (t ) ∝ J 't )Y at 9 2, ∂x

Acporleoh (  ) ( ) t ( ) (t ), j ( t t „ J– ( t 9 2 ⇑ j ( t t   9 J– ( t   ∂t . Akrc tolroik tork`hcr cfc, tordkwkm suakh portkfykkf-portkfykkf ykfg aciufnue`kf ac kwke mkm cfc. Skctu mkhwk Qolroik Akskr @keùeus C akf CC morekù4 ;) J '( x ) 9 j ( x ) =)

∠

m

k

J '( t ) at at 9 J (m ) ∝ J ( k )

Ektchkf (^lke [ucs) 4 Icske`kf j  jufgsc jufgsc tk` fogktcj akf torcftogrke`kf (ko) pkak P k Y. Acaojcfcsc`kf k, m J(x ) 9

∠

x

k

j ( t ) at

mu`tc`kf mkhwk

∠

m

k

J '( t ) at ≡

∠

m

k

j (t ) at

Dkwkm 4 Rortkik actufdu``kf mkhwk J  tk` tk` turuf. @krofk j ≯ 2, ik`k x 5 y ⇝ Pk, x ) ⊍ Pk, y ) ⇑

∠

x

j ≡

k

∠

y

k

j ⇑ J (x ) ≡ J ( y )

Dkac, J  tk` tk` turuf. Ik`k=

∠

m

k

J '( t ) at ≡ J (m ) ∝ J ( k ) 9

∠

m

k

j (t ) at ∝ 2 9

∠

m

k

j (t ) at

Nlftlh 4 Acòtkhuc j ( ( x x ) 9 scf x , x ∈ P2, ς  Y. Kpk`kh j ∈ MZ pkak P2, ς  Y< Dkwkm 4 Icske`kf E  somkrkfg somkrkfg pkrtcsc akrc P2, ς  Y. Ik`k E 4 2 9 x 2 5 x ; 5 ... 5 x ` 9 ς . Actcfdku auk `ksus. @ksus C4 Dc`k ς = ∈ E , ik`k ∎f2 , 2 ≡ f2 ≡ f  sohcfggk t2 ( j ) 9 ς

f 2

∛ c 9;

j ( x c ) ∝ j ( x c ∝; ) +

9

`

∛ c 9 f 2 +;

 f 2

9 ∛ j ( x c ) ∝ j ( x c ∝; ) + c 9;

j ( x c ) ∝ j ( x c ∝; )

 `

∛

c 9 f 2 +;

j ( x c ∝; ) ∝ j ( x c )

9 j ( x f ) ∝ j ( x 2 ) + j ( x f ) ∝ j ( x ` ) 2

2

9 j ( ς= ) ∝ j ( 2 ) + j ( ς = ) ∝ j (ς ) 9 scf ς= ∝ scf 2 + scf ς = ∝ scf ς 9= @ksus = 4 Dc`k ς = ∃ E , ik`k ∎f; , 2 ≡ f; ≡ ` sohcfggk x f; ∝; 5 ς = 5 x f ; . = Echkt

Qolroik hkekikf 71 8;

Mkm ? „ Qurufkf akf Cftogrke

t2 ( j ) 9 ς

f ; ∝;

∛ c 9;

Nlipceoa my 4 @hkorlfc, ^.^c

j ( x c ) ∝ j ( x c ∝; ) + j ( x f; ) ∝ j ( x f; ∝; ) +

`

∛ c 9 f ; +;

j ( x c ) ∝ j ( x c ∝; )

f ; ∝;

9 ∛ j ( x c ) ∝ j ( x c ∝; ) + j ( x f ) ∝ j ( = ) + j ( = ) ∝ j ( x f ∝; ) + ς

;

c 9;

`

ς

;

c 9 f ; +;

f ; ∝;

≡ ∛ j ( x c ) ∝ j ( x c ∝; ) + j ( x f ) ∝ j ( = ) + j ( = ) ∝ j ( x f ∝; ) + ς

ς

;

c 9;

;

 9 9 j ( ς= ) ∝ j ( 2 ) + j ( ς = ) ∝ j (ς ) 9 scf ς= ∝ scf 2 + scf ς = ∝ scf ς 9=



Dkac,

⎧ =, t 2 ( j ) 9 ⎨ ⎣≡ =, ς

∈ E ς = ∃ E ς

=

ôhcfggk Q2ς ( j ) 9 = 5 ∖ . Dkac tormu`tc j ∈ MZ pkak P2, ς  Y

8=

∛ `

∛

c 9f ; +;

j ( x c ) ∝ j ( x c ∝; ) j ( x c ) ∝ j ( x c ∝; )

Diktat Kuliah s2 Analisis Real

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