群環


在抽象代數中,群環是從一個群 Gdisplaystyle GG 及交換環 Rdisplaystyle RR 構造出的環,通常記為 R[G]displaystyle R[G]displaystyle R[G]RGdisplaystyle RGdisplaystyle RG。其定義為:



R[G]:=⨁g∈GRegdisplaystyle R[G]:=bigoplus _gin GRe_gqquad displaystyle R[G]:=bigoplus _gin GRe_gqquad (換言之,這是由基底 eg:g∈Gdisplaystyle e_g:gin Gdisplaystyle e_g:gin G 張出的自由 Rdisplaystyle RR-模)

其上的 Rdisplaystyle RR-線性乘法運算由 eg⋅eh=eghdisplaystyle e_gcdot e_h=e_ghdisplaystyle e_gcdot e_h=e_gh 給出。R[G]displaystyle R[G]displaystyle R[G]Rdisplaystyle RR-模的加法與上述乘法形成一個 Rdisplaystyle RR-代數。乘法單位元素為 1:=eedisplaystyle 1:=e_edisplaystyle 1:=e_e


最常用的是 R=Zdisplaystyle R=mathbb Z displaystyle R=mathbb Z R=Cdisplaystyle R=mathbb C displaystyle R=mathbb C 的群環。對於後者,C[G]displaystyle mathbb C [G]mathbb C[G] 成為 Gdisplaystyle GG 的表示:s∑ageg=∑agesgdisplaystyle ssum a_ge_g=sum a_ge_sgdisplaystyle ssum a_ge_g=sum a_ge_sg;若 Gdisplaystyle GG 為有限群,則稱此表示為正則表示。正則表示與有限群的表示理論有密切的聯繫。


對於無窮階的群 Gdisplaystyle GG,迄今對群環的結構仍所知甚少。對於局部緊拓撲群,通常採用 Cc(G)displaystyle C_c(G)displaystyle C_c(G)L1(G)displaystyle L^1(G)displaystyle L^1(G) 對摺積構成的代數,較有利於研究群的拓撲性質及其表示。



文獻



  • A. A. Bovdi, Group algebra, (编) Hazewinkel, Michiel, 数学百科全书, Springer, 2001, ISBN 978-1-55608-010-4 

  • C.W. Curtis, I. Reiner, Representation theory of finite groups and associative algebras, Interscience (1962)

  • D.S. Passman, The algebraic structure of group rings, Wiley (1977)


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