Linear Progress with Exponential Decay in Weakly Hyperbolic Groups

Linear Progress with Exponential Decay in Weakly Hyperbolic Groups

A random walk \(w_n\) on a separable, geodesic hyperbolic metric space \(X\) converges to the boundary \(\partial X\) with probability one when the step distribution supports two independent loxodromics. In particular, the random walk makes positive linear progress. Progress is known to be linear wi...

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Veröffentlicht in:arXiv.org 2017-10
1. Verfasser: Sunderland, Matt
Format: Artikel
Sprache:eng
Schlagworte:
Decay
Mathematics - Geometric Topology
Metric space
Random walk
Random walk theory
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Zusammenfassung:A random walk \(w_n\) on a separable, geodesic hyperbolic metric space \(X\) converges to the boundary \(\partial X\) with probability one when the step distribution supports two independent loxodromics. In particular, the random walk makes positive linear progress. Progress is known to be linear with exponential decay when (1) the step distribution has exponential tail and (2) the action on \(X\) is acylindrical. We extend exponential decay to the non-acylindrical case.
ISSN:2331-8422
DOI:10.48550/arxiv.1710.05107