On the homology of partial group representations
Abstract
We study how the partial group (co)homology of a group G with coefficient in a partial representation M can be described using the usual group (co)homology. To address this, we introduce the concept of the universal globalization (M) of a partial group representation M of G. Our main result shows that the partial group homology Hpar(G, M) is naturally isomorphic to the classical group homology H(G, (M)). We extend this result to the cohomological framework, obtaining a spectral sequence involving the classical group cohomology that converges to the partial group cohomology. Notably, when G is countable, the spectral sequence collapses, resulting in a natural isomorphism Hpar(G, M) H(G, HomKpar G((KparG), M)), where KparG stands for the partial group algebra of G.
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