English

Shape optimization for piecewise parameter identification in inverse diffusion problems with a single boundary measurement

Numerical Analysis 2026-01-27 v3 Numerical Analysis Optimization and Control

Abstract

This paper explores the reconstruction of a space-dependent parameter in inverse diffusion problems, proposing a shape-optimization-based approach. We consider a Robin boundary condition, physically motivated in diffuse optical tomography to model partial reflection of light at tissue boundaries [Arr99, GFB83a]. This ensures well-posedness of the forward problem, while related inverse problems with Dirichlet or Neumann conditions have also been considered in previous studies [Mef21]. The main objective is to recover the absorption coefficient from a single boundary measurement. While conventional gradient-based methods rely on the Frechet derivative of a cost functional with respect to the unknown parameter, we also utilize its Eulerian derivative with respect to the unknown boundary interface for recovery. This non-conventional approach addresses parameter recovery when only a single boundary measurement can be obtained, providing a method for its reconstruction. Numerical experiments confirm the effectiveness of the proposed method, even for intricate and non-convex boundary interfaces.

Keywords

Cite

@article{arxiv.2503.14764,
  title  = {Shape optimization for piecewise parameter identification in inverse diffusion problems with a single boundary measurement},
  author = {Manabu Machida and Hirofumi Notsu and Julius Fergy Tiongson Rabago},
  journal= {arXiv preprint arXiv:2503.14764},
  year   = {2026}
}
R2 v1 2026-06-28T22:26:02.158Z