Fixed Point Composition and Toeplitz-Composition C*-algebras

Abstract

Let be a linear-fractional, non-automorphism self-map of D that fixes ζ ∈ T and satisfies (ζ) ≠ 1 and consider the composition operator C acting on the Hardy space H2(D). We determine which linear-fractionally-induced composition operators are contained in the unital C*-algebra generated by C and the ideal K of compact operators. We apply these results to show that C*(C, K) and C*(Fζ), the unital C*-algebra generated by all composition operators induced by linear-fractional, non-automorphism self-maps of D that fix ζ, are each isomorphic, modulo the ideal of compact operators, to a unitization of a crossed product of C0([0,1]). We compute the K-theory of C*(C, K) and calculate the essential spectra of a class of operators in this C*-algebra. We also obtain a full description of the structures, modulo the ideal of compact operators, of the C*-algebras generated by the unilateral shift Tz and a single linear-fractionally-induced composition operator.