Transfer operator for ultradifferentiable expanding maps of the circle
Abstract
Given a C∞ expanding map T of the circle, we construct a Hilbert space H of smooth functions on which the transfer operator L associated to T acts as a compact operator. This result is made quantitative (in terms of singular values of the operator L acting on H) using the language of Denjoy-Carleman classes. Moreover, the nuclear power decomposition of Baladi and Tsujii can be performed on the space H, providing a bound on the growth of the dynamical determinant associated to L.
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