Endomorphisms and Modular Theory of 2-Graph C*-Algebras

Abstract

In this paper, we initiate the study of endomorphisms and modular theory of the graph C*-algebras θof a 2-graph on a single vertex. We prove that there is a semigroup isomorphism between unital endomorphisms of θ and its unitary pairs with a twisted property. We characterize when endomorphisms preserve the fixed point algebra of the gauge automorphisms and its canonical masa . Some other properties of endomorphisms are also investigated. As far as the modular theory of θ is concerned, we show that the algebraic *-algebra generated by the generators of θ with the inner product induced from a distinguished state ω is a modular Hilbert algebra. Consequently, we obtain that the von Neumann algebra π(θ)" generated by the GNS representation of ω is an AFD factor of type III1, provided m n∈. Here m,n are the numbers of generators of of degree (1,0) and (0,1), respectively. This work is a continuation of DPY1, DPY2 by Davidson-Power-Yang and DY by Davidson-Yang.