Manuel Stadlbauer
Published 2011-10-13, updated 2012-10-21Version 3
The main results of this note extend a theorem of Kesten for symmetric random walks on discrete groups to group extensions of topological Markov chains. In contrast to the result in probability theory, there is a notable asymmetry in the assumptions on the base. That is, it turns out that, under very mild assumptions on the continuity and symmetry of the associated potential, amenability of the group implies that the Gurevic-pressures of the extension and the base coincide whereas the converse holds true if the potential is H\"older continuous and the topological Markov chain has big images and preimages. Finally, an application to periodic hyperbolic manifolds is given.
Comments: New proof of Lemma 5.3 due to the gap in the first version of the article
Journal: Advances in Mathematics 235 (2013), 450-468
Right-Permutative Cellular Automata on Topological Markov Chains
Topological Markov chains of given entropy and period with or without measure of maximal entropy
Amenability, Critical Exponents of Subgroups and Growth of Closed Geodesics
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