English

Sharp norm estimates of layer potentials and operators at high frequency

Analysis of PDEs 2016-01-19 v5

Abstract

In this paper, we investigate single and double layer potentials mapping boundary data to interior functions of a domain at high frequency λ2\lambda^2\to\infty. For single layer potentials, we find that the L2(Ω)L2(Ω)L^{2}(\partial\Omega)\to{}L^{2}(\Omega) norms decay in λ\lambda. The rate of decay depends on the curvature of Ω\partial\Omega: The norm is λ3/4\lambda^{-3/4} in general domains and λ5/6\lambda^{-5/6} if the boundary Ω\partial\Omega is curved. The double layer potential, however, displays uniform L2(Ω)L2(Ω)L^{2}(\partial\Omega)\to{}L^{2}(\Omega) bounds independent of curvature. By various examples, we show that all our estimates on layer potentials are sharp. The appendix by Galkowski gives bounds L2(Ω)L2(Ω)L^{2}(\partial\Omega)\to{}L^{2}(\partial\Omega) for the single and double layer operators at high frequency that are sharp modulo logλ\log \lambda. In this case, both the single and double layer operator bounds depend upon the curvature of the boundary.

Keywords

Cite

@article{arxiv.1403.6576,
  title  = {Sharp norm estimates of layer potentials and operators at high frequency},
  author = {Jeffrey Galkowski and Xiaolong Han and Melissa Tacy},
  journal= {arXiv preprint arXiv:1403.6576},
  year   = {2016}
}

Comments

The paper authored by Xiaolong Han and Melissa Tacy now includes an appendix by Jeffrey Galkowski on double layer operators

R2 v1 2026-06-22T03:34:37.054Z