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Main Authors: Bretin, Élie, Kacedan, Eliott, Seppecher, Laurent
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.17562
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author Bretin, Élie
Kacedan, Eliott
Seppecher, Laurent
author_facet Bretin, Élie
Kacedan, Eliott
Seppecher, Laurent
contents This article aims to present a general analysis of a class of inverse problems that consists in recovering the elliptic parameter maps in systems of PDEs, such as the linear elastic system, from the knowledge of some of their solutions. This identification problem is reformulated as a first-order linear system of the form $\nabla\bmμ + \bm{B} \cdot \bmμ = F$, where $F$ and $\g B$ are tensor fields constructed from the data. A closed range property is proved, which induces $L^2$-stability estimates. We then characterize the null space by introducing the concept of conservative third-order tensor field. Finally, a discretization based on the finite element method is proposed and some numerical examples show the efficiency of this approach to recover anisotropic elastic parameters from both static and dynamic solutions of the PDE system.
format Preprint
id arxiv_https___arxiv_org_abs_2505_17562
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Multi-parameter identification in systems of PDEs from internal data
Bretin, Élie
Kacedan, Eliott
Seppecher, Laurent
Analysis of PDEs
This article aims to present a general analysis of a class of inverse problems that consists in recovering the elliptic parameter maps in systems of PDEs, such as the linear elastic system, from the knowledge of some of their solutions. This identification problem is reformulated as a first-order linear system of the form $\nabla\bmμ + \bm{B} \cdot \bmμ = F$, where $F$ and $\g B$ are tensor fields constructed from the data. A closed range property is proved, which induces $L^2$-stability estimates. We then characterize the null space by introducing the concept of conservative third-order tensor field. Finally, a discretization based on the finite element method is proposed and some numerical examples show the efficiency of this approach to recover anisotropic elastic parameters from both static and dynamic solutions of the PDE system.
title Multi-parameter identification in systems of PDEs from internal data
topic Analysis of PDEs
url https://arxiv.org/abs/2505.17562