Weyl formula for the eigenvalues of the dissipative acoustic operator

Vesselin Petkov

arXiv:2104.02341·math.AP·November 16, 2021

Weyl formula for the eigenvalues of the dissipative acoustic operator

Vesselin Petkov

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TL;DR

This paper derives a Weyl law for the eigenvalues of a dissipative acoustic operator in exterior domains, revealing asymptotic behavior of solutions with energy decay under specific boundary conditions.

Contribution

It establishes a Weyl formula for eigenvalues of the dissipative acoustic operator, especially for convex obstacles with positive boundary dissipation.

Findings

01

Weyl formula for eigenvalues when boundary dissipation exceeds 1

02

Asymptotic distribution of eigenvalues for convex obstacles

03

Eigenvalues correspond to exponentially decaying solutions

Abstract

We study the wave equation in the exterior of a bounded domain $K$ with dissipative boundary condition $\partial_{ν} u - γ (x) \partial_{t} u = 0$ on the boundary $Γ$ and $γ (x) > 0.$ The solutions are described by a contraction semigroup $V (t) = e^{tG}, t \geq 0.$ The eigenvalues $λ_{k}$ of $G$ with $Re λ_{k} < 0$ yield asymptotically disappearing solutions $u (t, x) = e^{λ_{k} t} f (x)$ having exponentially decreasing global energy. We establish a Weyl formula for these eigenvalues in the case $min_{x \in Γ} γ (x) > 1.$ For strictly convex obstacles $K$ this formula concerns all eigenvalues of $G .$

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Taxonomy

TopicsAdvanced Mathematical Modeling in Engineering · Numerical methods in inverse problems · Stability and Controllability of Differential Equations