Weighted theory of Toeplitz operators on the Fock spaces

Abstract

We study the weighted compactness and boundedness of Toeplitz operators on the Fock spaces. Fix α>0. Let T be the Toeplitz operator on the Fock space F2α over Cn with symbol ∈ L∞. For 1<p<∞ and any finite sum T of finite products of Toeplitz operators T's, we show that T is compact on the weighted Fock space Fpα,w if and only if its Berezin transform vanishes at infinity, where w is a restricted Ap-weight on Cn. Concerning boundedness, for 1≤ p<∞, we characterize the r-doubling weights w such that T is bounded on the weighted spaces Lpα,w via a -adapted Ap-type condition. Our method also establishes a two weight inequality for the Fock projections in the case of r-doubling weights. Moreover, we characterize the corresponding weighted compactness of Bergman--Toeplitz operators, which answers a question raised by Stockdale and Wagner [Math. Z. 305 (2023), no. 1, Paper No. 10].