Mark Kesseböhmer, Sabrina Kombrink
Published 2016-04-27Version 1
We prove a complex Ruelle-Perron-Frobenius theorem for Markov shifts over an infinite alphabet, whence extending results by M. Pollicott from the finite to the infinite alphabet setting. As an application we obtain an extension of renewal theory in symbolic dynamics, as developed by S. P. Lalley and in the sequel generalised by the second author, now covering the infinite alphabet case.
An Application of Topological Multiple Recurrence to Tiling
An application of Jacquet-Langlands correspondence to transfer operators for geodesic flows on Riemann surfaces
Parameter regularity of dynamical determinants of expanding maps of the circle and an application to linear response
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