Invertible Toeplitz products, weighted norm inequalities, and Ap weights

Abstract

In this paper, we characterize invertible Toeplitz products on a number of Banach spaces of analytic functions, including weighted Bergman space Lpa (Bn, dvγ), the Hardy space Hp(∂ D), and the weighted Fock space Fα p for p > 1. The common tool in the proofs of our characterizations will be the theory of weighted norm inequalities and Ap type weights. Moreover, we analyze and compare the various Ap type conditions that arise in our characterizations. Finally, we extend the "reverse H\"older inequality" of Zheng and Stroethoff SZ1, SZ2 for p = 2 to the general case of p > 1.