Spectral optimization for Robin Laplacian on domains admitting parallel coordinates
Abstract
In this paper we deal with spectral optimization for the Robin Laplacian on a family of planar domains admitting parallel coordinates, namely a fixed-width strip built over a smooth closed curve and the exterior of a convex set with a smooth boundary. We show that if the curve length is kept fixed, the first eigenvalue referring to the fixed-width strip is for any value of the Robin parameter maximized by a circular annulus. Furthermore, we prove that the second eigenvalue in the exterior of a convex domain corresponding to a negative Robin parameter does not exceed the analogous quantity for a disk whose boundary has a curvature larger than or equal to the maximum of that for .
Cite
@article{arxiv.2001.02718,
title = {Spectral optimization for Robin Laplacian on domains admitting parallel coordinates},
author = {Pavel Exner and Vladimir Lotoreichik},
journal= {arXiv preprint arXiv:2001.02718},
year = {2022}
}
Comments
14 pages, no figures, the title and the assumptions of the main theorem slightly modified in comparison with the first version. To appear in Mathematische Nachrichten