Self-Dual Polynomials, Hermite Matrices, and Heisenberg Functionals

Ron Perline

doi:10.1137/0609031

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Self-Dual Polynomials, Hermite Matrices, and Heisenberg Functionals

Journal article

Peer reviewed

Self-Dual Polynomials, Hermite Matrices, and Heisenberg Functionals

Ron Perline

SIAM journal on matrix analysis and applications, v 9(3), pp 373-377

01 Jul 1988

DOI: https://doi.org/10.1137/0609031

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Abstract

Commuting

Fourier transforms

Inequality

Polynomials

For certain orthogonal matrices associated with classical self dual discrete orthogonal families, commuting symmetric tridiagonal matrices are constructed. Their eigenvectors are shown to be critical points for functionals related to Heisenberg's inequality.

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Title: Self-Dual Polynomials, Hermite Matrices, and Heisenberg Functionals
Creators: Ron Perline
Publication Details: SIAM journal on matrix analysis and applications, v 9(3), pp 373-377
Publisher: Society for Industrial and Applied Mathematics
Resource Type: Journal article
Language: English
Academic Unit: Mathematics
Web of Science ID: WOS:A1988P239000008
Other Identifier: 991019184020104721

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Web of Science research areas: Mathematics, Applied

Self-Dual Polynomials, Hermite Matrices, and Heisenberg Functionals

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