Orthogonal matrix-valued polynomials and applications : seminar on operator theory at the School of Mathematical Sciences, Tel Aviv University
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Bibliographic Information
Orthogonal matrix-valued polynomials and applications : seminar on operator theory at the School of Mathematical Sciences, Tel Aviv University
(Operator theory : advances and applications, v. 34)
Springer Basel AG, c1988
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Note
Bibliography of Mark Grigorévich Krein: p. 1-24
Papers presented at the Seminar on Operator Theory during the spring semester of 1987 and 1988, and dedicated to M.G. Krein on the occasion of his 80th birthday
Description and Table of Contents
Description
This paper is a largely expository account of the theory of p x p matrix polyno mials associated with Hermitian block Toeplitz matrices and some related problems of interpolation and extension. Perhaps the main novelty is the use of reproducing kernel Pontryagin spaces to develop parts of the theory in what hopefully the reader will regard as a reasonably lucid way. The topics under discussion are presented in a series of short sections, the headings of which give a pretty good idea of the overall contents of the paper. The theory is a rich one and the present paper in spite of its length is far from complete. The author hopes to fill in some of the gaps in future publications. The story begins with a given sequence h_n" ... , hn of p x p matrices with h-i = hj for j = 0, ... , n. We let k = O, ... ,n, (1.1) denote the Hermitian block Toeplitz matrix based on ho, ... , hk and shall denote its 1 inverse H k by (k)] k [ r = .. k = O, ... ,n, (1.2) k II} . '-0 ' I- whenever Hk is invertible.
Table of Contents
Bibliography of Mark Grigor'Evich Krein.- On Orthogonal Matrix Polynomials.- n-Orthonormal Operator Polynomials.- Extension of a Theorem of M. G. Krein on Orthogonal Polynomials for the Nonstationary Case.- Hermitian Block Toeplitz Matrices, Orthogonal Polynomials, Reproducing Kernel Pontryagin Spaces, Interpolation and Extension.- Matrix Generalizations of M. G. Krein Theorems on Orthogonal Polynomials.- Polynomials Orthogonal in an Indefinite Metric.
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