Curvature inequalities for operators in the Cowen-Douglas class of a planar domain

Abstract

Fix a bounded planar domain . If an operator T, in the Cowen-Douglas class B1(), admits the compact set as a spectral set, then the curvature inequality KT(w) ≤ - 4 π2 S(w,w)2, where S is the S\"zego kernel of the domain , is evident. Except when is simply connected, the existence of an operator for which KT(w) = 4 π2 S(w,w)2 for all w in is not known. However, one knows that if w is a fixed but arbitrary point in , then there exists a bundle shift of rank 1, say S, depending on this w, such that KS*(w) = 4 π2 S(w,w)2. We prove that these extremal operators are uniquely determined: If T1 and T2 are two operators in B1() each of which is the adjoint of a rank 1 bundle shift and KT1(w) = -4π 2 S(w,w)2 = KT2(w) for a fixed w in , then T1 and T2 are unitarily equivalent. A surprising consequence is that the adjoint of only some of the bundle shifts of rank 1 occur as extremal operators in domains of connectivity greater than 1. These are described explicitly.