Odd and even Maass cusp forms for Hecke triangle groups, and the billiard flow
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Publication:2793103
DOI10.1017/etds.2014.64zbMath1364.37056arXiv1303.0528OpenAlexW3104158215WikidataQ114119561 ScholiaQ114119561MaRDI QIDQ2793103
Publication date: 15 March 2016
Published in: Ergodic Theory and Dynamical Systems (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1303.0528
Fredholm determinantSelberg zeta functiontransfer operatorHecke triangle groupPhillips-Sarnak conjecture
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Related Items (9)
Ruelle-Pollicott resonances for manifolds with hyperbolic cusps ⋮ Period Functions for Maass Wave Forms and Cohomology ⋮ Eigenfunctions of Transfer Operators and Automorphic Forms for Hecke Triangle Groups of Infinite Covolume ⋮ Reflection positivity. Abstracts from the workshop held November 26 -- December 2, 2017 ⋮ Some results on Hecke and extended Hecke groups ⋮ Holomorphic Automorphic Forms and Cohomology ⋮ A thermodynamic formalism approach to the Selberg zeta function for Hecke triangle surfaces of infinite area ⋮ Meromorphic continuation of Selberg zeta functions with twists having non-expanding cusp monodromy ⋮ A transfer-operator-based relation between Laplace eigenfunctions and zeros of Selberg zeta functions
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