Constructing surfaces with first Steklov eigenvalue of arbitrarily large multiplicity
Spectral Theory
2025-10-08 v1 Differential Geometry
Abstract
We construct surfaces with arbitrarily large multiplicity for their first non-zero Steklov eigenvalue. The proof is based on a technique by M. Burger and B. Colbois originally used to prove a similar result for the Laplacian spectrum. We start by constructing surfaces with a specific subgroup of isometry for each prime . We do so by gluing surfaces with boundary following the structure of the Cayley graph of . We then exploit the properties of and in order to show that an irreducible representation of high degree (depending on ) acts on the eigenspace of functions associated with , leading to the desired result.
Cite
@article{arxiv.2412.07692,
title = {Constructing surfaces with first Steklov eigenvalue of arbitrarily large multiplicity},
author = {Samuel Audet-Beaumont},
journal= {arXiv preprint arXiv:2412.07692},
year = {2025}
}