A sharp upper bound on the spectral gap for graphene quantum dots
Abstract
The main result of this paper is a sharp upper bound on the first positive eigenvalue of Dirac operators in two dimensional simply connected -domains with infinite mass boundary conditions. This bound is given in terms of a conformal variation, explicit geometric quantities and of the first eigenvalue for the disk. Its proof relies on the min-max principle applied to the squares of these Dirac operators. A suitable test function is constructed by means of a conformal map. This general upper bound involves the norm of the derivative of the underlying conformal map in the Hardy space . Then, we apply known estimates of this norm for convex and for nearly circular, star-shaped domains in order to get explicit geometric upper bounds on the eigenvalue. These bounds can be re-interpreted as reverse Faber-Krahn-type inequalities under adequate geometric constraints.
Cite
@article{arxiv.1812.03029,
title = {A sharp upper bound on the spectral gap for graphene quantum dots},
author = {Vladimir Lotoreichik and Thomas Ourmières-Bonafos},
journal= {arXiv preprint arXiv:1812.03029},
year = {2019}
}
Comments
Mathematical Physics, Analysis and Geometry (in press)