On an Extension Problem for Contractive Block Hankel Operator Matrices
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Bernd Fritzsche
Abstract
The paper deals with an operator extension problem for contractive block Hankel operators which arose in the context of the operator version of the classical Nehari interpolation problem. V.M. Adamjan, D.Z. Arov, and M.G. Krein [5] obtained that the solution set of this operator extension problem is an operator ball. Hereby, they constructed the parameters of this operator ball via a regularization procedure using the corresponding expressions of the first studied nondegenerate case. The main aim of this paper is to derive more explicit formulas for the parameters of this operator ball. Hereby we use Moore-Penrose inverses of bounded linear operators in Hilbert space.
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Articles in the same Issue
- Masthead
- On the universality for L-functions attached to Maass forms
- On an Extension Problem for Contractive Block Hankel Operator Matrices
- Boundary value problems for the inhomogeneous polyanalytic equation I
- On a discrete variant of Bernstein’s polynomial inequality
- Strong Cesàro summability and statistical limit of fourier integrals
- An extension of the Piatetski-Shapiro prime number theorem
Articles in the same Issue
- Masthead
- On the universality for L-functions attached to Maass forms
- On an Extension Problem for Contractive Block Hankel Operator Matrices
- Boundary value problems for the inhomogeneous polyanalytic equation I
- On a discrete variant of Bernstein’s polynomial inequality
- Strong Cesàro summability and statistical limit of fourier integrals
- An extension of the Piatetski-Shapiro prime number theorem
