The inverse problem for Krein orthogonal matrix functions |
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| Authors: | I. Gohberg M. A. Kaashoek L. Lerer |
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| Affiliation: | (1) School of Mathematical Sciences, Tel-Aviv University, Israel;(2) Afdeling Wiskunde, Faculteit der Exacte Wetenschappen, Vrije Universiteit, Amsterdam;(3) Department of Mathematics, Technion—Israel Institute of Technology, Haifa |
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| Abstract: | ![]()
In the mid-fifties, in a seminal paper, M. G. Krein introduced continuous analogs of Szeg? orthogonal polynomials on the unit circle and established their main properties. In this paper, we generalize these results and subsequent results that he obtained jointly with Langer to the case of matrix-valued functions. Our main theorems are much more involved than their scalar counterparts. They contain new conditions based on Jordan chains and root functions. The proofs require new techniques based on recent results in the theory of continuous analogs of resultant and Bezout matrices and solutions of certain equations in entire matrix functions. |
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| Keywords: | Krein orthogonal function continuous analog of orthogonal polynomials entire matrix function equation Jordan chain root function inverse problem |
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