Spectral asymptotics and estimates for matrix Birman-Schwinger operators with singular measures

Abstract

We consider operators of the form T=A*(Vμ)A in RN, where A is a pseudodifferential operator of order -l, μ is a compactly supported singular measure, order s>0 Ahlfors-regular, and V is a weight function on the support of μ. The scalar type operator A and the weight function V are supposed to be m× m matrix valued. We establish Weyl type asymptotic formulas for singular numbers and eigenvalues of T for μ being the natural measure on a compact Lipschitz surface. For a general Ahlfors-regular measure μ, we prove that the previously found upper spectral estimates are order sharp.