Heat trace asymptotics and compactness of isospectral potentials for the Dirichlet Laplacian

Abstract

Let be a C∞-smooth bounded domain of Rn, n ≥ 1, and let the matrix a ∈ C∞ (;n2) be symmetric and uniformly elliptic. We consider the L2()-realization A of the operator - ( a ∇ ·) with Dirichlet boundary conditions. We perturb A by some real valued potential V ∈ C0∞ () and note AV=A+V. We compute the asymptotic expansion of tr( e-t AV-e-t A) as t 0 for any matrix a whose coefficients are homogeneous of degree 0. In the particular case where A is the Dirichlet Laplacian in , that is when a is the identity of n2, we make the four main terms appearing in the asymptotic expansion formula explicit and prove that L∞-bounded sets of isospectral potentials of A are Hs-compact for s <2.