Szeg\H{o} and para-orthogonal polynomials on the real line: Zeros and canonical spectral transformations

We study polynomials which satisfy the same recurrence relation as the Szegő polynomials, however, with the restriction that the (reflection) coefficients in the recurrence are larger than one in modulus. Para-orthogonal polynomials that follow from these Szegő polynomials are also considered. With...

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Bibliographic Details
Published in:Mathematics of computation 2012, Vol.81 (280), p.2229
Main Authors: Kenier Castillo, é, Fernando Rodrigo Rafaeli, Alagacone Sri Ranga
Format: Article
Language:English
Online Access:Get full text
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Summary:We study polynomials which satisfy the same recurrence relation as the Szegő polynomials, however, with the restriction that the (reflection) coefficients in the recurrence are larger than one in modulus. Para-orthogonal polynomials that follow from these Szegő polynomials are also considered. With positive values for the reflection coefficients, zeros of the Szegő polynomials, para-orthogonal polynomials and associated quadrature rules are also studied. Finally, again with positive values for the reflection coefficients, interlacing properties of the Szegő polynomials and polynomials arising from canonical spectral transformations are obtained.
ISSN:0025-5718
1088-6842
DOI:10.1090/S0025-5718-2012-02593-2