Schatten classes, nuclearity and nonharmonic analysis on compact manifolds with boundary

Abstract

Given a compact manifold M with boundary ∂ M, in this paper we introduce a global symbolic calculus of pseudo-differential operators associated to (M,∂ M). The symbols of operators with boundary conditions on ∂ M are defined in terms of the biorthogonal expansions in eigenfunctions of a fixed operator L with the same boundary conditions on ∂ M. The boundary ∂ M is allowed to have (arbitrary) singularities. As an application, several criteria for the membership in Schatten classes on L2(M) and r-nuclearity on Lp(M) are obtained. We also describe a new addition to the Grothendieck-Lidskii formula in this setting. Examples and applications are given to operators on M=[0,1]n with non-periodic boundary conditions, and of operators with non-local boundary conditions.