A New Necessary Condition for the Hyponormality of Toeplitz Operators on the Bergman Space

Abstract

A well known result of C. Cowen states that, for a symbol ∈ L∞ , \; f+g \;\;(f,g∈ H2), the Toeplitz operator T acting on the Hardy space of the unit circle is hyponormal if and only if f=c+Thg, for some c∈ C, h∈ H∞ , \| h\| ∞≤ 1. \ In this note we consider possible versions of this result in the Bergman space case. \ Concretely, we consider Toeplitz operators on the Bergman space of the unit disk, with symbols of the form α zn+β zm +γ z p + δ z q, where α, β, γ, δ ∈ C and m,n,p,q ∈ Z+, m < n and p < q. \ By letting T act on vectors of the form zk+c z+d zr \; \; (k<<r), we study the asymptotic behavior of a suitable matrix of inner products, as k → ∞. \ As a result, we obtain a sharp inequality involving the above mentioned data: |α |2 n2 + |β |2 m2 - |γ |2 p2 - |δ |2 q2 2 | α β m n - γ δ p q |. This inequality improves a number of existing results, and it is intended to be a precursor of basic necessary conditions for joint hyponormality of tuples of Toeplitz operators acting on Bergman spaces in one or several complex variables.