On integral equations related to weighted Toepitz operators

Abstract

For weighted Toeplitz operators Nφ defined on spaces of holomorphic functions in the unit ball, we derive regularity properties of the solutions f to the integral equation Nφ(f)=h in terms of the regularity of the symbol φ and the data h. As an application, we deduce that if f0 is a function in the Hardy space H1 such that its argument f/f is in a Lipschitz space on the unit sphere , then f is also in the same Lipschitz space, extending a result of K. Dyakonov to several complex variables.