The twisted partial group algebra and (co)homology of partial crossed products

Abstract

Given a group G and a partial factor set σ of G, we introduce the twisted partial group algebra parσG, which governs the partial projective σ-representations of G into algebras over a filed . Using the relation between partial projective representations and twisted partial actions we endow parσ G with the structure of a crossed product by a twisted partial action of G on a commutative subalgebra of parσ G. Then, we use twisted partial group algebras to obtain a first quadrant Grothendieck spectral sequence converging to the Hochschild homology of the crossed product A G, involving the Hochschild homology of A and the partial homology of G, where is a unital twisted partial action of G on a -algebra A with a -based twist. An analogous third quadrant cohomological spectral sequence is also obtained.

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