Lp-Cuntz algebras and spectrum of weighted composition operators

Abstract

Let p∈ [1,∞). We define an Lp-operator algebra crossed product by a transfer operator for the topological Bernoulli shift on X=\1,...,n\N, and we prove it is isometrically isomorphic to the Lp-analog Onp of the Cuntz algebra introduced by Phillips. As an application, we prove that the spectrum of the associated `abstract weighted shift operators' aT, a∈ C(X), is a disk with a radius given by the formula r(aT)=μ∈Erg(X,) ( ∫X (|a|1p)dμ + h(μ)p ) where is a potential associated to the transfer operator, and h(μ) is Kolmogorov-Sinai entropy. This generalizes classical results for p=2.

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