English

Quantitative unique continuation for operators with partially analytic coefficients. Application to approximate control for waves

Analysis of PDEs 2015-06-16 v1

Abstract

In this article, we first prove quantitative estimates associated to the unique continuation theorems for operators with partially analytic coefficients of Tataru, Robbiano-Zuily and H\"ormander. We provide local stability estimates that can be propagated, leading to global ones. Then, we specify the previous results to the wave operator on a Riemannian manifold M\mathcal{M} with boundary. For this operator, we also prove Carleman estimates and local quantitative unique continuation from and up to the boundary M\partial \mathcal{M}. This allows us to obtain a global stability estimate from any open set Γ\Gamma of M\mathcal{M} or M\partial \mathcal{M}, with the optimal time and dependence on the observation. This provides the cost of approximate controllability: for any T>2supxM(dist(x,Γ))T>2 \sup_{x \in \mathcal{M}}(dist(x,\Gamma)), we can drive any data of H01×L2H^1_0 \times L^2 in time TT to an ε\varepsilon-neighborhood of zero in L2×H1L^2 \times H^{-1}, with a control located in Γ\Gamma, at cost eC/εe^{C/\varepsilon}. We also obtain similar results for the Schr\"odinger equation.

Keywords

Cite

@article{arxiv.1506.04254,
  title  = {Quantitative unique continuation for operators with partially analytic coefficients. Application to approximate control for waves},
  author = {Camille Laurent and Matthieu Léautaud},
  journal= {arXiv preprint arXiv:1506.04254},
  year   = {2015}
}
R2 v1 2026-06-22T09:53:04.154Z