On the similarity of powers of operators with flag structure

Abstract

Let L2a(D) be the classical Bergman space and denote Mh for the multiplication operator by a function h. Let B be a finite Blaschke product with order n.An open question proposed by R. G. Douglas is whether the operators MB on L2a(D) similar to 1n Mz on 1n L2a(D)? The question was answered in the affirmative, not only for Bergman space but also for many other Hilbert spaces with reproducing kernels.Since the operator Mz* is in Cowen-Douglas class B1(D) in many cases, Douglas's question can be expressed as a version for operators in B1(D), and it is affirmative for many operators in B1(D).A natural question is how about Douglas's question in the version for operators in Cowen-Douglas class Bn(D) (n>1)? In this paper, we investigate a family of operators, which are in a norm dense subclass of Cowen-Douglas class B2(D), and give a negative answer.This indicates that Douglas's question cannot be directly generalized to general Hilbert spaces with vector-valued analytical reproducing kernel.

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