Spectrum of weighted isometries: C*-algebras, transfer operators and topological pressure

Abstract

We study the spectrum of operators aT∈ B(H) on a Hilbert space H where T is an isometry and a belongs to a commutative C*-subalgebra C(X) A⊂eq B(H) such that the formula L(a)=T*aT defines a faithful transfer operator on A. Based on the analysis of the C*-algebra C*(A,T) generated by the operators aT, a∈ A, we give dynamical conditions implying that the spectrum σ(aT) is invariant under rotation around zero, σ(aT) coincides with essential spectrum σess(aT) or that σ(aT)=\z∈ C: |z|≤ r(aT)\ is a disk. We extend classical Ruelle's result and prove that for a general expanding map :X X and continuous c:X [0,∞) the spectral logarythm of a Ruelle-Perron-Frobenious operator Lcf(y)=Σx∈ -1(y) c(x)f(x) is equal to the topological pressure P( c,). As a consequence we get the variational principle for the spectral radius: r(aT)=μ∈ Erg(X,) (∫X( a )\,dμ +h(μ)2 ), where Erg(X,) stands for ergodic Borel probability measures, h(μ) is the Kolmogorov-Sinai entropy, and :X [0,1] is the cocycle associated to L. In particular, we clarify the relationship between the Kolmogorov-Sinai entropy and t-entropy introduced by Antonevich, Bakhtin and Lebedev.