Lifting graph C*-algebra maps to Leavitt path algebra maps

Abstract

Let :C*(E) C*(F) be a unital *-homomorphism between simple purely infinite Cuntz-Krieger algebras of finite graphs. We prove that there exists a unital *-homomorphism φ:L(E) L(F) between the corresponding Leavitt path-algebras such that is homotopic to the map φ:C*(E) C*(F) induced by completion. We show moreover that φ is a homotopy equivalence in the C*-algebraic sense if and only if φ is a homotopy equivalence in the algebraic, polynomial sense. We deduce, in particular, that any isomorphism between simple purely infinite Cuntz-Krieger algebras is homotopic to the completion of a unital algebraic homotopy equivalence.

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