C*-algebras generated by multiplication operators and composition operators by functions with self-similar branches II

Abstract

Let K be a compact metric space and let : K K be continuous. We study a C*-algebra MC generated by all multiplication operators by continuous functions on K and a composition operator C induced by on a certain L2 space. Let γ = (γ1, …, γn) be a system of proper contractions on K. Suppose that γ1, …, γn are inverse branches of and K is self-similar. We consider the Hutchinson measure μH of γ and the L2 space L2(K, μH). Then we show that the C*-algebra MC is isomorphic to the C*-algebra Oγ (K) associated with γ under the open set condition and the measure separation condition. This is a generalization of our previous work, in which we studied the case where γ satisfied the finite branch condition.