Subnormal Operators and Quadrature Domains

Let R be an irreducible Cartan domain of rank r and genus p and B, (Y > p -1) be the Berezin transform on R. It is known that as v tends to infinity, the Berezin transform admits the asymptotic expansion B, M C' p,, Q k U k where the Qk'S are certain invariant differential operatorsfor instance, Qo

The problem of finding optimal lattice domains for kernel operators with values in rearrangement invariant spaces on the interval [0,1] is considered. The techniques used are based on interpolation theory and integration with respect to C([0, 1])-valued measures.

We construct convolution operators which define isomorphisms between SOBOLEV spaces of distributions supported on a canonical LIPSCHITZ domain. These operators are need for reduction of order of WIENER-HOPF equations or pseudodifferential equations on a canoniaal LIPSCHITZ domain. = inf {llvlla: v

## Abstract Properties of integral operators with weak singularities arc investigated. It is assumed that __G__ ⊂ ℝ^n^ is a bounded domain. The boundary δ__G__ should be smooth concerning the Sobolev trace theorem. It will be proved that the integral operators \documentclass{article}\pagestyle{empt