Computational Methods For Extremal Steklov Problems
Spectral Theory
2017-06-21 v1 Optimization and Control
Abstract
We develop a computational method for extremal Steklov eigenvalue problems and apply it to study the problem of maximizing the -th Steklov eigenvalue as a function of the domain with a volume constraint. In contrast to the optimal domains for several other extremal Dirichlet- and Neumann-Laplacian eigenvalue problems, computational results suggest that the optimal domains for this problem are very structured. We reach the conjecture that the domain maximizing the -th Steklov eigenvalue is unique (up to dilations and rigid transformations), has p-fold symmetry, and an axis of symmetry. The -th Steklov eigenvalue has multiplicity 2 if is even and multiplicity 3 if is odd.
Cite
@article{arxiv.1601.00605,
title = {Computational Methods For Extremal Steklov Problems},
author = {Eldar Akhmetgaliyev and Chiu-Yen Kao and Braxton Osting},
journal= {arXiv preprint arXiv:1601.00605},
year = {2017}
}
Comments
14 pages, 8 figures