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Main Author: Baudet, Cédric
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2405.12883
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author Baudet, Cédric
author_facet Baudet, Cédric
contents We consider the Helmholtz equation in an angular sector partially covered by a homogeneous layer of small thickness, denoted $\varepsilon$. We propose in this work an asymptotic expansion of the solution with respect to $\varepsilon$ at any order. This is done using matched asymptotic expansion, which consists here in introducing different asymptotic expansions of the solution in three subdomains: the vicinity of the corner, the layer and the rest of the domain. These expansions are linked through matching conditions. The presence of the corner makes these matching conditions delicate to derive because the fields have singular behaviors. Our approach is to reformulate these matching conditions purely algebraically by writing all asymptotic expansions as formal series. By using algebraic calculus we reduce the matching conditions to scalar relations linking the singular behaviors of the fields. These relations have a convolutive structure and involve some coefficients that can be computed analytically. Our asymptotic expansion is justified rigorously with error estimates.
format Preprint
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institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Asymptotic analysis at any order of Helmholtz's problem in a corner with a thin layer: an algebraic approach
Baudet, Cédric
Analysis of PDEs
35C20 (Primary) 35J05, 35A21 (Secondary)
We consider the Helmholtz equation in an angular sector partially covered by a homogeneous layer of small thickness, denoted $\varepsilon$. We propose in this work an asymptotic expansion of the solution with respect to $\varepsilon$ at any order. This is done using matched asymptotic expansion, which consists here in introducing different asymptotic expansions of the solution in three subdomains: the vicinity of the corner, the layer and the rest of the domain. These expansions are linked through matching conditions. The presence of the corner makes these matching conditions delicate to derive because the fields have singular behaviors. Our approach is to reformulate these matching conditions purely algebraically by writing all asymptotic expansions as formal series. By using algebraic calculus we reduce the matching conditions to scalar relations linking the singular behaviors of the fields. These relations have a convolutive structure and involve some coefficients that can be computed analytically. Our asymptotic expansion is justified rigorously with error estimates.
title Asymptotic analysis at any order of Helmholtz's problem in a corner with a thin layer: an algebraic approach
topic Analysis of PDEs
35C20 (Primary) 35J05, 35A21 (Secondary)
url https://arxiv.org/abs/2405.12883