Toeplitz Operators and Skew Carleson measures for weighted Bergman spaces on strongly pseudoconvex domains

Abstract

In this paper we study mapping properties of Toeplitz-like operators on weighted Bergman spaces of bounded strongly pseudconvex domains in Cn. In particular we prove that a Toeplitz operator built using as kernel a weighted Bergman kernel of weight β and integrating against a measure μ maps continuously (when β is large enough) a weighted Bergman space Ap1α1(D) into a weighted Bergman space Ap2α2(D) if and only if μ is a (λ,γ)-skew Carleson measure, where λ=1+1p1-1p2 and γ=1λ(β+α1p1-α2p2). This theorem generalizes results obtained by Pau and Zhao on the unit ball, and extends and makes more precise results obtained by Abate, Raissy and Saracco on a smaller class of Toeplitz operators on bounded strongly pseudoconvex domains.