English

Inverse problems for linear hyperbolic equations using mixed formulations

Optimization and Control 2015-06-11 v1

Abstract

We introduce in this document a direct method allowing to solve numerically inverse type problems for linear hyperbolic equations. We first consider the reconstruction of the full solution of the wave equation posed in Ω×(0,T)\Omega\times (0,T) - Ω\Omega a bounded subset of RN\mathbb{R}^N - from a partial distributed observation. We employ a least-squares technique and minimize the L2L^2-norm of the distance from the observation to any solution. Taking the hyperbolic equation as the main constraint of the problem, the optimality conditions are reduced to a mixed formulation involving both the state to reconstruct and a Lagrange multiplier. Under usual geometric optic conditions, we show the well-posedness of this mixed formulation (in particular the inf-sup condition) and then introduce a numerical approximation based on space-time finite elements discretization. We prove the strong convergence of the approximation and then discussed several examples for N=1N=1 and N=2N=2. The problem of the reconstruction of both the state and the source term is also addressed.

Keywords

Cite

@article{arxiv.1502.00114,
  title  = {Inverse problems for linear hyperbolic equations using mixed formulations},
  author = {Nicolae Cindea and Arnaud Munch},
  journal= {arXiv preprint arXiv:1502.00114},
  year   = {2015}
}
R2 v1 2026-06-22T08:17:34.280Z