Finite Rank Perturbations of Toeplitz Products on the Bergman Space

Abstract

In this paper we investigate when a finite sum of products of two Toeplitz operators with quasihomogeneous symbols is a finite rank perturbation of another Toeplitz operator on the Bergman space. We discover a noncommutative convolution on the space of quasihomogeneous functions and use it in solving the problem. Our main results show that if Fj, Gj (1≤ j≤ N) are polynomials of z and z then Σj=1NTFjTGj-TH is a finite rank operator for some L1-function H if and only if Σj=1NFj Gj belongs to L1 and H=Σj=1NFj Gj. In the case Fj's are holomorphic and Gj's are conjugate holomorphic, it is shown that H is a solution to a system of first order partial differential equations with a constraint.