Almost everywhere convergence of spectral sums for self-adjoint operators

Abstract

Let L be a non-negative self-adjoint operator acting on the space L2(X), where X is a metric measure space. Let L=∫0∞ λ dE L(λ) be the spectral resolution of L and SR( L)f=∫0R dE L(λ) f denote the spherical partial sums in terms of the resolution of L. In this article we give a sufficient condition on L such that R→ ∞ SR( L)f(x) =f(x),\ \ a.e. for any f such that log (2+L) f∈ L2(X). These results are applicable to large classes of operators including Dirichlet operators on smooth bounded domains, the Hermite operator and Schr\"odinger operators with inverse square potentials.