Spectral Properties of the Dirichlet Operator Σi=1d (-∂i2)s on Domains in d-Dimensional Euclidean Space

Abstract

In this article we investigate the distribution of eigenvalues of the Dirichlet pseudo-differential operator Σi=1d(-∂i2)s, \, s∈ (1/2,1] on an open and bounded subdomain ⊂ Rd and predict bounds on the sum of the first N eigenvalues, the counting function, the Riesz means and the trace of the heat kernel. Moreover, utilizing the connection of coherent states to the semi-classical approach of Quantum Mechanics we determine the sum for moments of eigenvalues of the associated Schr\"odinger operator.