Symmetric cohomology of groups and Poincar\'e duality
Abstract
Let G be a finite group of order n and let M be a G-module. We construct groups H*(G,M) for which Hk (G,Mtw) Hn-k-1λ(G,M), where Mtw is a twisting of a G-module M defined in Section 5 and H*λ(G,M) is a variation of the group cohomology introduced by Zarelua, which in many cases is isomorphic to the symmetric cohomology of groups defined by Staic. The groups H*(G,M) come together with transformations from Tate cohomology. We find conditions under which these transformations are isomorphisms.
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