Weighted theory of Toeplitz operators on the Bergman space

Abstract

We study the weighted compactness and boundedness properties of Toeplitz operators on the Bergman space with respect to B\'ekoll\`e-Bonami type weights. Let Tu denote the Toeplitz operator on the (unweighted) Bergman space of the unit ball in Cn with symbol u ∈ L∞. We characterize the compact Toeplitz operators on the weighted Bergman space Apσ for all σ in a subclass of the B\'ekoll\`e-Bonami class Bp that includes radial weights and powers of the Jacobian of biholomorphic mappings. Concerning boundedness, we show that Tu extends boundedly on Lpσ for p ∈ (1,∞) and weights σ in a u-adapted class of weights containing Bp, and we establish analogous weighted endpoint weak-type (1,1) bounds for weights beyond B1.