The Partial-Isometric Crossed Products by Semigroups of Endomorphisms as Full Corners

Abstract

Suppose + is the positive cone of a totally ordered abelian group , and (A,+,α) is a system consisting of a C*-algebra A, an action α of + by extendible endomorphisms of A. We prove that the partial-isometric crossed product A×απso+ is a full corner in the subalgebra of (2(+,A)), and that if α is an action by automorphisms of A, then it is the isometric-crossed product (B+ A)×^+, which is therefore a full corner in the usual crossed product of system by a group of automorphisms. We use these realizations to identify the ideal of A×απso+ such that the quotient is the isometric crossed product A×α^+.