The Nica-Toeplitz algebras of dynamical systems over abelian lattice-ordered groups as full corners

Abstract

Consider the pair (G,P) consisting of an abelian lattice-ordered discrete group G and its positive cone P. Let α be an action of P by extendible endomorphisms of a C*-algebra A. We show that the Nica-Toeplitz algebra Tcov(A×α P) is a full corner of a group crossed product BβG, where B is a subalgebra of ∞(G,A) generated by a collection of faithful copies of A, and the action β on B is given by the shift on ∞(G,A). By using this realization, we show that the ideal I of Tcov(A×α P) for which the quotient algebra Tcov(A×α P)/I is the isometric crossed product A×αiso P is also a full corner in an ideal JβG of BβG.