Toeplitz Operators on Bergman Spaces

Abstract

Let G be a bounded, open, connected, non-empty subset of the complex plane C. We put the usual two dimensional (Lebesgue) area measure on G and consider the Hilbert space L²(G) that consists of the complex-valued, measurable functions defined on G that are square integrable. The inner product on L²(G) is given by the norm ‖h‖₂ of a function h in L²(G) is given by ‖h‖₂ = (∫_G|h|²)^1/2.The Bergman space of G, denoted L_a²(G), is the set of functions in L²(G) that are analytic on G. The Bergman space L_a²(G) is actually a closed subspace of L²(G) (see [12 , Section 1.4]) and thus it is a Hilbert space.Let G denote the closure of G and let C(G) denote the set of continuous, complex-valued functions defined on G.