Julia Slipantschuk, Oscar F. Bandtlow, Wolfram Just
Published 2013-06-03Version 1
We show that for any $\lambda \in \mathbb{C}$ with $|\lambda|<1$ there exists an analytic expanding circle map such that the eigenvalues of the associated transfer operator (acting on holomorphic functions) are precisely the nonnegative powers of $\lambda$ and $\bar{\lambda}$. As a consequence we obtain a counterexample to a variant of a conjecture of Mayer on the reality of spectra of transfer operators.
Comments: 15 pages, 3 figures
Reversible biholomorphic germs
On the spectrum of Farey and Gauss maps
EDMD for expanding circle maps and their complex perturbations
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