Group cohomology

introduction

• For a finite group G and its module M, $H^{0}(G,M)$ is isomorphic to $M/N(M)$ where $N(m) = \sum_{\sigma\in G}\sigma m$

central extension

• A central extension of a group $G$ is a short exact sequence of groups

\[1\rightarrow A\rightarrow E\rightarrow G\rightarrow 1\] such that $A$ is in $Z(E)$, the center of the group $E$.

• The set of isomorphism classes of central extensions of $G$ by $A$ (where $G$ acts trivially on $A$) is in one-to-one correspondence with the cohomology group $H^2(G, A)$.

expositions

• Sprehn, David. 2014. “Nonvanishing Cohomology Classes on Finite Groups of Lie Type with Coxeter Number at Most P.” arXiv:1407.3299 [math], July. http://arxiv.org/abs/1407.3299.
• Nakano, Daniel K. “Cohomology of Algebraic Groups, Finite Groups, and Lie Algebras: Interactions and Connections.” arXiv:1404.3342 [math], April 12, 2014. http://arxiv.org/abs/1404.3342.
• Alejandro Adem, Recent developments in the cohomology of finite groups, Notices Amer. Math. Soc. 44 (1997), no. 7, 806–812 http://www.ams.org/notices/199707/adem.pdf