The growth of the Green function for random walks and Poincar{\'e} series
Given a probability measure $\mu$ on a finitely generated group $\Gamma$, the Green function $G(x,y|r)$ encodes many properties of the random walk associated with $\mu$. Finding asymptotics of $G(x,y|r)$ as $y$ goes to infinity is a common thread in probability theory and is usually referred as rene...
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| Main Authors | , , |
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| Format | Journal Article |
| Language | English |
| Published |
20.07.2023
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| Subjects | |
| Online Access | Get full text |
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| Summary: | Given a probability measure $\mu$ on a finitely generated group $\Gamma$, the
Green function $G(x,y|r)$ encodes many properties of the random walk associated
with $\mu$. Finding asymptotics of $G(x,y|r)$ as $y$ goes to infinity is a
common thread in probability theory and is usually referred as renewal theory
in literature. Endowing $\Gamma$ with a word distance, we denote by $H_r(n)$
the sum of the Green function $G(e,x|r)$ along the sphere of radius $n$. This
quantity appears naturally when studying asymptotic properties of branching
random walks driven by $\mu$ on $\Gamma$ and the behavior of $H_r(n)$ as $n$
goes to infinity is intimately related to renewal theory. Our motivation in
this paper is to construct various examples of particular behaviors for
$H_r(n)$. First, our main result exhibits a class of relatively hyperbolic
groups with convergent Poincar{\'e} series generated by $H_r(n)$, which answers
some questions raised in a previous paper of the authors. Along the way, we
investigate the behavior of $H_r(n)$ for several classes of finitely generated
groups, including abelian groups, certain nilpotent groups, lamplighter groups,
and Cartesian products of free groups. |
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| DOI: | 10.48550/arxiv.2307.10662 |