Some relations satisfied by Hermite-Hermite matrix polynomials

Shehata, Ayman; Upadhyaya, Lalit Mohan

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Title:	Some relations satisfied by Hermite-Hermite matrix polynomials (English)
Author:	Shehata, Ayman
Author:	Upadhyaya, Lalit Mohan
Language:	English
Journal:	Mathematica Bohemica
ISSN:	0862-7959 (print)
ISSN:	2464-7136 (online)
Volume:	142
Issue:	2
Year:	2017
Pages:	145-162
Summary lang:	English
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Category:	math
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Summary:	The classical Hermite-Hermite matrix polynomials for commutative matrices were first studied by Metwally et al. (2008). Our goal is to derive their basic properties including the orthogonality properties and Rodrigues formula. Furthermore, we define a new polynomial associated with the Hermite-Hermite matrix polynomials and establish the matrix differential equation associated with these polynomials. We give the addition theorems, multiplication theorems and summation formula for the Hermite-Hermite matrix polynomials. Finally, we establish general families and several new results concerning generalized Hermite-Hermite matrix polynomials. (English)
Keyword:	Hermite-Hermite polynomials
Keyword:	matrix generating functions
Keyword:	orthogonality property
Keyword:	Rodrigues formula
Keyword:	associated Hermite-Hermite polynomials
Keyword:	generalized Hermite-Hermite matrix polynomials
MSC:	15A60
MSC:	33C45
MSC:	33C50
MSC:	33C80
MSC:	34A25
MSC:	44A45
idZBL:	Zbl 06738576
idMR:	MR3660172
DOI:	10.21136/MB.2016.0001-15
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Date available:	2017-05-23T09:58:51Z
Last updated:	2020-07-01
Stable URL:	http://hdl.handle.net/10338.dmlcz/146749
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