Average Error for Spectral Asymptotics on Surfaces

Robert S. Strichartz

arXiv:1301.4963·math.CA·January 22, 2013·2 cites

Average Error for Spectral Asymptotics on Surfaces

Robert S. Strichartz

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TL;DR

This paper investigates the average error in spectral asymptotics for the Laplacian on compact surfaces with nonnegative curvature, proposing a conjecture for its asymptotic behavior based on geometric analysis.

Contribution

It introduces a refined asymptotic formula for eigenvalue counting on surfaces and conjectures the asymptotic behavior of the average error, supported by specific examples.

Findings

01

Proposes a refined asymptotic formula for eigenvalue counting.

02

Conjectures the asymptotic behavior of the average error.

03

Provides examples supporting the conjecture.

Abstract

Let $N (t)$ denote the eigenvalue counting funtion of the Laplacian on a compact surface of constant nonnegative curvature, with or without boundary. We define a refined asymptotic formula $\tilde{N} (t) = A t + B t^{1/2} + C$ , where the constants are expressed in terms of the geometry of the surface and its boundary, and consider the average error $A (t) = \frac{1}{t} \int_{0}^{t} D (s) d s$ for $D (t) = N (t) - \tilde{N} (t)$ . We present a conjecture for the asymptotic behavior of $A (t)$ , and study some examples that support the conjecture.

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Taxonomy

TopicsSpectral Theory in Mathematical Physics · Advanced Mathematical Modeling in Engineering · Mathematical Dynamics and Fractals