Compactness of relatively isospectral sets of surfaces via conformal surgeries

Autor: Frédéric Rochon, Clara L. Aldana, Pierre Albin
Rok vydání: 2015
Předmět:
Mathematics - Differential Geometry
Spectral theory
media_common.quotation_subject
Mathematics::Number Theory
Boundary (topology)
Conformal map
01 natural sciences
Hyperbolic funnels
Mathematics - Spectral Theory
symbols.namesake
0103 physical sciences
FOS: Mathematics
0101 mathematics
Spectral Theory (math.SP)
Analytic surgery
Mathematics
media_common
010102 general mathematics
Mathematical analysis
Inverse spectral problem
Hyperbolic cusps
Mathematics::Spectral Theory
Infinity
58J50
58J35
Mathematics::Geometric Topology
Compact space
Isospectral
Differential Geometry (math.DG)
Differential geometry
Fourier analysis
symbols
Relatively isospectral
Mathematics [G03] [Physical
chemical
mathematical & earth Sciences]
010307 mathematical physics
Geometry and Topology
Mathématiques [G03] [Physique
chimie
mathématiques & sciences de la terre]
Zdroj: Journal of Geometric Analysis
Popis: We introduce a notion of relative isospectrality for surfaces with boundary having possibly non-compact ends either conformally compact or asymptotic to cusps. We obtain a compactness result for such families via a conformal surgery that allows us to reduce to the case of surfaces hyperbolic near infinity recently studied by Borthwick and Perry, or to the closed case by Osgood, Phillips and Sarnak if there are only cusps.
22 pages, 3 figures
Databáze: OpenAIRE
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