Observability inequalities for heat equations with potentials
Abstract
This paper is mainly concerned with the observability inequalities for heat equations with time-dependent Lipschtiz potentials. The observability inequality for heat equations asserts that the total energy of a solution is bounded above by the energy localized in a subdomain with an observability constant. For a bounded measurable potential , the factor in the observability constant arising from the Carleman estimate is best known to be (even for time-independent potentials). In this paper, we show that, for Lipschtiz potentials, this factor can be replaced by , which improves the previous bound in some typical scenarios. As a consequence, with such a Lipschitz potential, we obtain a quantitative regular control in a null controllability problem. In addition, for the one-dimensional heat equation with some time-independent bounded measurable potential , we obtain the optimal observability constant.
Keywords
Cite
@article{arxiv.2409.09476,
title = {Observability inequalities for heat equations with potentials},
author = {Jiuyi Zhu and Jinping Zhuge},
journal= {arXiv preprint arXiv:2409.09476},
year = {2025}
}
Comments
31 pages