On Cauchy dual operator and duality for Banach spaces of analytic functions

Abstract

In this paper, two related types of dualities are investigated. The first is the duality between left-invertible operators and the second is the duality between Banach spaces of vector-valued analytic functions. We will examine a pair (B,) consisting of a reflexive Banach spaces B of vector-valued analytic functions on which a left-invertible multiplication operator acts and an operator-valued holomorphic function . We prove that there exist a dual pair (B,) such that the space B is unitarily equivalent to the space B* and the following intertwining relations hold equation* L U = UMz* MzU = U L*, equation* where U is the unitary operator between B and B*. In addition we show that and are connected through the relationequation* (( z) e1) (λ),e2= e1,(( λ) e2)(z) equation* for every e1,e2∈ E, z∈ , λ∈ . If a left-invertible operator T satisfies certain conditions, then both T and the Cauchy dual operator T can be modelled as a multiplication operator on reproducing kernel Hilbert spaces of vector-valued analytic functions H and H, respectively. We prove that Hilbert space of the dual pair of (H,) coincide with H, where is a certain operator-valued holomorphic function. Moreover, we characterize when the duality between spaces H and H obtained by identifying them with H is the same as the duality obtained from the Cauchy pairing.