A Non-Concentration Estimate for Partially Rectangular Billiards

Hans Christianson

Type: Article

Publication Date: 2014-10-27

Citations: 1

DOI: https://doi.org/10.1080/03605302.2014.974060

Abstract

We consider quasimodes on planar domains with a partially rectangular boundary. We prove that for any ε0 > 0, an 𝒪(λ−ε0 ) quasimode must have L 2 mass in the “wings” (in phase space) bounded below by λ−2−δ for any δ > 0. The proof uses the author's recent work on 0-Gevrey smooth domains to approximate quasimodes on C 1, 1 domains. There is an improvement for C k, α and C ∞ domains.

Locations

Communications in Partial Differential Equations - View
arXiv (Cornell University) - View - PDF
Carolina Digital Repository (University of North Carolina at Chapel Hill) - View - PDF

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+	Ergodic properties of eigenfunctions for the Dirichlet problem	1993	Patrick Gérard Éric Leichtnam
+ PDF Chat	Unique Continuation for Quasimodes on Surfaces of Revolution: Rotationally invariant Neighbourhoods	2015	Hans Christianson
+ PDF Chat	Ergodic billiards that are not quantum unique ergodic	2010	Andrew Hassell
+	Semiclassical non-concentration near hyperbolic orbits	2007	Hans Christianson
+ PDF Chat	Quantum Monodromy and nonconcentration near a closed semi-hyperbolic orbit	2011	Hans Christianson
+ PDF Chat	Bouncing Ball Modes and Quantum Chaos	2005	Nicolas Burq Maciej Zworski
+ PDF Chat	Spreading of quasimodes in the Bunimovich stadium	2006	Nicolas Burq Andrew Hassell Jared Wunsch
+	Uniform distribution of eigenfunctions on compact hyperbolic surfaces	1987	Steven Zelditch
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