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Orthogonality, Lommel integrals and cross product zeros of linear combinations of Bessel functions. [PDF]
Springerplus, 2015 Ziener CH, Kurz FT, Buschle LR, Kampf T.
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Series of products of Gegenbauer polynomials
Mathematische Zeitschrift, 1955 openaire +1 more source
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Universal Journal of Mathematics and Mathematical Sciences, 2021
Summary: In this paper, it is shown that the terms of Gegenbauer polynomial satisfy the Jacobi identity.
Edeke, U. E., Udo, N. E.
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Summary: In this paper, it is shown that the terms of Gegenbauer polynomial satisfy the Jacobi identity.
Edeke, U. E., Udo, N. E.
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Derivatives of Generalized Gegenbauer Polynomials
Theoretical and Mathematical Physics, 2002zbMATH Open Web Interface contents unavailable due to conflicting licenses.
García Fuertes, W., Perelomov, A. M.
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Gegenbauer Polynomials Revisited
The Fibonacci Quarterly, 1985Der Gegenstand dieser Arbeit sind spezielle Polynome, die sich in der Tafel der Gegenbauerschen Polynome entlang der abnehmenden Diagonalen bilden. Dabei werden einige Eigenschaften dieser Polynome diskutiert wie z.B. expliziter Ausdruck, erzeugende Funktion, rekurrenter Ausdruck, Differentialgleichung u.s.w.
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Information entropy of Gegenbauer polynomials
Journal of Physics A: Mathematical and General, 2000Summary: The information entropy of Gegenbauer polynomials is relevant since this is related to the angular part of the information entropies of certain quantum mechanical systems such as the harmonic oscillator and the hydrogen atom in \(D\) dimensions.
Buyarov, V. S. +3 more
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Appendix: Gegenbauer Polynomials
2016This chapter collects some properties of the Gegenbauer polynomials that we use throughout this work, in particular, in the proof of the explicit formulae for differential symmetry breaking operators (Theorems 1.5, 1.6, 1.7, and 1.8) and the factorization identities for special parameters (Theorems 13.1, 13.2, and 13.3).
Toshiyuki Kobayashi +2 more
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Higher Spin Generalisation of the Gegenbauer Polynomials
Complex Analysis and Operator Theory, 2016zbMATH Open Web Interface contents unavailable due to conflicting licenses.
David Eelbode, Tim Janssens
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Gegenbauer-Sobolev Orthogonal Polynomials
1994In this paper, orthogonal polynomials in the Sobolev space W 1,2([-1,1], p (α),λ p (α)), where \({\rho ^{(\alpha )}} = {(1 - {x^2})^{\alpha - \frac{1}{2}}},\alpha >- \frac{1}{2}\) and λ ≥ 0, are studied. For these non-standard orthogonal polynomials algebraic and differential properties are obtained, as well as the relation with the classical ...
Francisco Marcellán +2 more
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Gegenbauer, Jacobi, and Orthogonal Polynomials
2016In earlier chapters we dealt with special sets of orthogonal polynomials, namely, Chebyshev and Hermite polynomials. In Chs. 9 and 10 we will study other orthogonal polynomials, namely, Laguerre and Legendre. All of these polynomial functions share many properties.
Vasudevan Lakshminarayanan +1 more
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