C*-crossed product of groupoid actions on categories

Abstract

Suppose that G is a groupoid acting on a small category H in the sense of [Definition 4]NOT and H×α G is the resulting semi-direct product category (as in [Proposition 8]NOT). We show that there exists a subcategory Hr ⊂eq H satisfying some nice property called ``regularity'' such that Hr ×α G = H×α G. Moreover, we show that there exists a so-called ``quasi action'' (see Definition quasi) β of G on C*(Hr) (where C*(Hr) is the semigroupoid C*-algebra as defined in EXE) such that C*(Hr×α G) = C*(Hr)×β G (where the crossed product for β is as defined in Definition cross).