Equivalence bundles over a finite group and strong Morita equivalence for unital inclusions of unital C*-algebras

Abstract

Let A= \At \t ∈ G and B= \Bt \t∈ G be C*-algebraic bundles over a finite group G. Let C=t ∈ GAt and D=t∈ GBt. Also, let A=Ae and B=Be, where e is the unit element in G. We suppose that C and D are unital and A and B have the unit elements in C and D, respectively. In this paper, we shall show that if there is an equivalence A-B-bundle over G with some properties, then the unital inclusions of unital C*-algebras A ⊂ C and B ⊂ D induced by A and B are strongly Morita equivalent. Also, we suppose that A and B are saturated and that A' C= C 1. We shall show that if A ⊂ C and B ⊂ D are strongly Morita equivalent, then there are an automorphism f of G and an equivalence bundle A-Bf -bundle over G with the some properties, where Bf is the C*-algebraic bundle induced by B and f, which is defined by Bf = \Bf(t) \t ∈ G. Furthermore, we shall give an application.