Hochschild and cyclic homology of the crossed product of algebraic irrational rotational algebra by finite subgraoups of SL(2, Z)

Abstract

Let ⊂ SL(2, Z) be a finite subgroup acting on the irrational rotational algebra Aθ via the restriction of the canonical action of SL(2, Z). Consider the crossed product algebra Aθalg obtained by the restriction of the action on the algberaic irrational rotational algebra. In this paper we prove many results on the homology group of the crossed product algebra Aθalg . We also analyse the case of the smooth crossed product algebra, Aθ and calculate some of its homology groups.