Bilinear Forms on the Dirichlet Space

Abstract

Let D be the classical Dirichlet space, the Hilbert space of holomorphic functions on the disk. Given a holomorphic symbol function b we define the associated Hankel type bilinear form, initially for polynomials f and g, by Tb(f,g):= < fg,b >D , where we are looking at the inner product in the space D. We let the norm of Tb denotes its norm as a bilinear map from D×D to the complex numbers. We say a function b is in the space X if the measure dμb:=| b(z)| 2dA is a Carleson measure for D and norm X by bX:=| b(0)| + | b(z)| 2dACM(D)1/2. Our main result is Tb is bounded if and only if b∈X and TbD× D≈ bX.