Homology and cohomology of crossed products by inverse monoid actions and Steinberg algebras

Abstract

Given a unital action θ of an inverse monoid S on an algebra A over a filed K we produce (co)homology spectral sequences which converge to the Hochschild (co)homology of the crossed product Aθ S with values in a bimodule over Aθ S. The spectral sequences involve a new kind of (co)homology of the inverse monoid S, which is based on KS-modules. The spectral sequences take especially nice form, when (Aθ S)e is flat as a left (homology case) or right (cohomology case) Ae-module, involving also the Hochschild (co)homology of A. Same nice spectral sequences are also obtained if K is a commutative ring, over which A is projective, and S is E-unitary. We apply our results to the Steinberg algebra AK(G) over a field K of an ample groupoid G, whose unit space G (0) is compact. In the homology case our spectral sequence collapses on the p-axis, resulting in an isomorphism between the Hochschild homology of AK(G) with values in an AK(G)-bimodule M and the homology of the inverse semigroup of the compact open bisections of G with values in the invariant submodule of M.