Green function and self-adjoint Laplacians on polyhedral surfaces
Spectral Theory
2020-09-16 v1 Differential Geometry
Abstract
Using Roelcke formula for the Green function, we explicitly construct a basis in the kernel of the adjoint Laplacian on a compact polyhedral surface and compute the -matrix of at the zero value of the spectral parameter. We apply these results to study various self-adjoint extensions of a symmetric Laplacian on a compact polyhedral surface of genus two with a single conical point. It turns out that the behaviour of the -matrix at the zero value of the spectral parameter is sensitive to the geometry of the polyhedron.
Cite
@article{arxiv.1902.03232,
title = {Green function and self-adjoint Laplacians on polyhedral surfaces},
author = {Alexey Kokotov and Kelvin Lagota},
journal= {arXiv preprint arXiv:1902.03232},
year = {2020}
}
Comments
27 pages, 1 Figure