Eigenvalue estimates and asymptotics for weighted pseudodifferential operators with singular measures in the critical case

Abstract

In a domain ⊂ RN we consider a selfadjoint operator T=A*PA , where A is a pseudodifferential operator of order -l=-N/2 and P=Vμ is a singular signed measure in concentrated on a Lipschitz surface of dimension d<N, absolutely continuous with respect to the surface measure μ on . We establish eigenvalue estimates and asymptotics for this operator. It turns out that the order of these estimates and asymptotics is independent of the dimension d of the surface. If there are several surfaces, possibly, of different dimensions, as well as an absolute continuous measure on the corresponding asymptotic coefficients add up.