C*-algebras associated with Hilbert C*-quad modules of C*-textile dynamical systems

Abstract

A C*-textile dynamical system ( A, ,η,,η, ) connsists of a unital C*-algebra A, two families of endomorphisms αα ∈ and ηaa ∈ η of A and certain commutation relations among them. It yields a two-dimensional subshift and multi structure of Hilbert C*-bimodules, which we call a Hilbert C*-quad module. We introduce a C*-algebra from the Hilbert C*-quad module as a two-dimensional analogue of Pimsner's construction of C*-algebras from Hilbert C*-bimodules. We study the C*-algebras defined by the Hilbert C*-quad modules and prove that they have universal properties subject to certain operator relations. We also present its examples arising from commuting matrices.