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Autori principali: Burrin, Claire, Nevo, Amos, Rühr, Rene, Weiss, Barak
Natura: Preprint
Pubblicazione: 2019
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Accesso online:https://arxiv.org/abs/1905.01493
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author Burrin, Claire
Nevo, Amos
Rühr, Rene
Weiss, Barak
author_facet Burrin, Claire
Nevo, Amos
Rühr, Rene
Weiss, Barak
contents We prove effective bounds on the rate in the quadratic growth asymptotics for the orbit of a non-uniform lattice of SL(2,R), acting linearly on the plane. This gives an error bound in the count of saddle connection holonomies, for some Veech surfaces. The proof uses Eisenstein series and relies on earlier work of many authors (notably Selberg). Our results improve earlier error bounds for counting in sectors and in smooth star shaped domains.
format Preprint
id arxiv_https___arxiv_org_abs_1905_01493
institution arXiv
publishDate 2019
record_format arxiv
spellingShingle Effective counting for discrete lattice orbits in the plane via Eisenstein series
Burrin, Claire
Nevo, Amos
Rühr, Rene
Weiss, Barak
Dynamical Systems
22E40
We prove effective bounds on the rate in the quadratic growth asymptotics for the orbit of a non-uniform lattice of SL(2,R), acting linearly on the plane. This gives an error bound in the count of saddle connection holonomies, for some Veech surfaces. The proof uses Eisenstein series and relies on earlier work of many authors (notably Selberg). Our results improve earlier error bounds for counting in sectors and in smooth star shaped domains.
title Effective counting for discrete lattice orbits in the plane via Eisenstein series
topic Dynamical Systems
22E40
url https://arxiv.org/abs/1905.01493