Homology and cohomology via the partial group algebra

Abstract

We study partial homology and cohomology from ring theoretic point of view via the partial group algebra KparG. In particular, we link the partial homology and cohomology of a group G with coefficients in an irreducible (resp. indecomposable) KparG-module with the ordinary homology and cohomology groups of G with in general non-trivial coefficients. Furthermore, we compare the standard cohomological dimension cd \ K(G) (over a field K) with the partial cohomological dimension cd \ Kpar(G) (over K) and show that cd \ Kpar(G) ≥ cd \ K(G) and that there is equality for G = Z.