Umumjahon ichki teorema - Universal embedding theorem

The universal joylashtirish teoremasi, yoki Krasner-Kaloujnine universal joylashtirish teoremasi, ning matematik fanidan olingan teorema guruh nazariyasi birinchi marta 1951 yilda nashr etilgan Mark Krasner va Lev Kaluznin.^[1] Teorema har qanday ekanligini ta'kidlaydi guruhni kengaytirish guruhning $H$ guruh tomonidan $A$ odatdagi kichik guruh uchun izomorfdir gulchambar mahsuloti $A Wr H .$ Teorema guruh nomi bilan nomlangan $A Wr H$ deb aytilgan universal ning barcha kengaytmalariga nisbatan $H$ tomonidan $A .$

Bayonot

Ruxsat bering $H$ va $A$ guruh bo'ling, ruxsat bering $K = A H$ dan barcha funktsiyalar to'plami bo'ling $H$ ga $A,$ va ko'rib chiqing harakat ning $H$ o'ngda ko'paytirish orqali o'zi. Bu harakat tabiiy ravishda ning harakatiga qadar kengayadi $H$ kuni $K$ tomonidan belgilanadi ${ displaystyle phi (g) .h = phi (gh ^ {- 1}),}$ qayerda ${ displaystyle phi in K,}$ va $g$ va $h$ ikkalasi ham $H .$ Bu avtomorfizmdir $K,$ shuning uchun biz yarim yo'nalishli mahsulotni aniqlay olamiz $K ⋊ H$ deb nomlangan oddiy gulchambar mahsulotiva belgilanadi $A Wr H$ yoki ${ displaystyle A wr H.}$ Guruh $K = A H$ (bu izomorfikdir ${ displaystyle {(f_ {x}, 1) in A wr H: x in K }}$ ) deyiladi tayanch guruh gulchambar mahsuloti.

The Krasner-Kaloujnine universal joylashtirish teoremasi agar shunday bo'lsa $G$ bor oddiy kichik guruh $A$ va $H = G / A,$ keyin bor in'ektsion homomorfizm guruhlar ${ displaystyle theta: G dan A wr H}$ shu kabi $A$ xaritalar sur'ektiv ravishda ustiga ${ displaystyle { text {im}} ( theta) cap K.}$ ^[2] Bu gulchambar mahsulotiga teng $A Wr H$ izomorfik kichik guruhga ega $G,$ qayerda $G$ ning har qanday kengaytmasi $H$ tomonidan $A .$

Isbot

Ushbu dalil Dikson-Mortimerdan olingan.^[3]

Gomomorfizmga ta'rif bering ${ displaystyle psi: G to H}$ uning yadrosi $A .$ To'plamni tanlang ${ displaystyle T = {t_ {u}: u in H }}$ ning (o'ngda) koset vakillarining $A$ yilda $G,$ qayerda ${ displaystyle psi (t_ {u}) = u.}$ Keyin hamma uchun $x$ yilda $G,$ ${ displaystyle t_ {u} xt_ {u psi (x)} ^ {- 1} in ker psi = A.}$ Har biriga $x$ yilda $G,$ biz funktsiyani aniqlaymiz $f x : H \to A$ shu kabi ${ displaystyle f_ {x} (u) = t_ {u} xt_ {u psi (x)} ^ {- 1}.}$ Keyin ko'mish ${ displaystyle theta}$ tomonidan berilgan ${ displaystyle theta (x) = (f_ {x}, psi (x)) in A wr H} ichida$

Endi biz bu gomomorfizm ekanligini isbotlaymiz. Agar $x$ va $y$ ichida $G,$ keyin ${ displaystyle theta (x) theta (y) = (f_ {x} (f_ {y}. psi (x) ^ {- 1}), psi (xy)).}$ Endi ${ displaystyle f_ {y} (u). psi (x) ^ {- 1} = f_ {y} (u psi (x)),}$ hamma uchun shunday $siz$ yilda $H,$

{ displaystyle f_ {x} (u) (f_ {y} (u). psi (x)) = t_ {u} xt_ {u psi (x)} ^ {- 1} t_ {u psi ( x)} yt_ {u psi (x) psi (y)} ^ {- 1} = t_ {u} xyt_ {u psi (xy)} ^ {- 1},}

shunday $f x f y = f xy .$ Shuning uchun ${ displaystyle theta}$ talab qilinadigan gomomorfizmdir.

Gomomorfizm in'ektsiondir. Agar ${ displaystyle theta (x) = theta (y),}$ keyin ikkalasi ham $f x (siz) = f y (siz)$ (Barcha uchun siz) va ${ displaystyle psi (x) = psi (y).}$ Keyin ${ displaystyle t_ {u} xt_ {u psi (x)} ^ {- 1} = t_ {u} yt_ {u psi (y)} ^ {- 1},}$ lekin biz bekor qilishimiz mumkin $t siz$ va ${ displaystyle t_ {u psi (x)} ^ {- 1} = t_ {u psi (y)} ^ {- 1}}$ ikkala tomondan ham shunday $x = y,$ shu sababli ${ displaystyle theta}$ in'ektsion hisoblanadi. Nihoyat, ${} displaystyle theta (x) in K}$ aniq qachon ${ displaystyle psi (x) = 1,}$ boshqacha qilib aytganda qachon ${ displaystyle x in A}$ (kabi ${ displaystyle A = ker psi}$ ).

Umumlashtirish va tegishli natijalar

The Kron-Rods teoremasi universal kiritish teoremasiga o'xshash bayonotdir, ammo uchun yarim guruhlar. Yarim guruh $S$ a bo'luvchi yarim guruh $T$ agar u bo'lsa rasm a kichik guruh ning $T$ homomorfizm ostida. Teoremada ta'kidlanishicha, har bir cheklangan yarim guruh $S$ sonli o'zgaruvchan gulchambar mahsulotining bo'luvchisi oddiy guruhlar (ularning har biri. ning bo'linuvchisi $S$ ) va cheklangan aperiodik yarim guruhlar.
Teoremaning muqobil versiyasi mavjud bo'lib, unga faqat guruh kerak $G$ va kichik guruh $A$ (normal bo'lishi shart emas).^[4] Ushbu holatda, $G$ oddiy gulchambar mahsulotining kichik guruhiga izomorfdir $A Wr (G / Yadro (A)).$

Adabiyotlar

^ Kaloujnine & Krasner (1951a).
^ Dikson va Mortimer (1996), p. 47).
^ Dikson va Mortimer (1996), 47-48 betlar).
^ Kaloujnine & Krasner (1951b).

Bibliografiya

Dikson, Jon; Mortimer, Brayan (1996). Permutatsion guruhlar. Springer. ISBN 978-0387945996.CS1 maint: ref = harv (havola)
Kaloujnine, Lev; Krasner, Mark (1951a). "Produit complete des groupes de permutations et le problème d'extension de groupes II". Acta Sci. Matematika. Seged. 14: 39–66.CS1 maint: ref = harv (havola)
Kaloujnine, Lev; Krasner, Mark (1951b). "Produit complete des groupes de permutations et le problème d'extension de groupes III". Acta Sci. Matematika. Seged. 14: 69–82.CS1 maint: ref = harv (havola)
Praeger, Cheril; Shnayder, Csaba (2018). Permutatsion guruhlar va dekartiya dekompozitsiyalari. Kembrij universiteti matbuoti. ISBN 978-0521675062.

[1] Kaloujnine & Krasner (1951a).

[2] Dikson va Mortimer (1996), p. 47).

[DM-3] Dikson va Mortimer (1996), 47-48 betlar).

[4] Kaloujnine & Krasner (1951b).

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