Spectral geometry in a rotating frame: properties of the ground state

Abstract

We investigate spectral properties of the operator describing a quantum particle confined to a planar domain rotating around a fixed point with an angular velocity ω and demonstrate several properties of its principal eigenvalue λ1ω. We show that as a function of rotating center position it attains a unique maximum and has no other extrema provided the said position is unrestricted. Furthermore, we show that as a function ω, the eigenvalue attains a maximum at ω=0, unique unless has a full rotational symmetry. Finally, we present an upper bound to the difference λ1,ω - λ1,Bω where the last named eigenvalue corresponds to a disk of the same area as .