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Generalized Angelescu polynomial

D. P. Shukla (1979)

Matematički Vesnik

Generalized Bessel function of type $D$ .

Demni, Nizar (2008)

SIGMA. Symmetry, Integrability and Geometry: Methods and Applications [electronic only]

Generalized Cesàro operators on certain function spaces

Sunanda Naik (2010)

Annales Polonici Mathematici

Motivated by some recent results by Li and Stević, in this paper we prove that a two-parameter family of Cesàro averaging operators $^{b, c}$ is bounded on the Dirichlet spaces $_{p, a}$ . We also give a short and direct proof of boundedness of $^{b, c}$ on the Hardy space $H^{p}$ for 1 < p < ∞.

Generalized coherent states for oscillators connected with Meixner and Meixner-Pollaczek polynomials.

Borzov, V.V., Damaskinskiĭ, E.V. (2004)

Zapiski Nauchnykh Seminarov POMI

Generalized coherent states for $q$ -oscillator associated with discrete $q$ -Hermite polynomials.

Borzov, V.V., Damaskinskii, E.V. (2004)

Journal of Mathematical Sciences (New York)

Generalized ellipsoidal and sphero-conal harmonics.

Volkmer, Hans (2006)

SIGMA. Symmetry, Integrability and Geometry: Methods and Applications [electronic only]

Generalized fractional calculus to a subclass of analytic functions for operators on Hilbert space.

Kim, Yong Chan, Choi, Jae Ho, Lee, Jin Seop (1998)

International Journal of Mathematics and Mathematical Sciences

Generalized $H_{m, m}^{m, 0}$ function fractional integration operators in some classes of analytic functions

V. Kiryakova (1988)

Matematički Vesnik

Generalized Hermite Polynomials

Gospava B. Đorđević (1993)

Publications de l'Institut Mathématique

Generalized hermite polynomials obtained by embeddings of the q-Heisenberg algebra

Joachim Seifert (1997)

Banach Center Publications

Several ways to embed q-deformed versions of the Heisenberg algebra into the classical algebra itself are presented. By combination of those embeddings it becomes possible to transform between q-phase-space and q-oscillator realizations of the q-Heisenberg algebra. Using these embeddings the corresponding Schrödinger equation can be expressed by various difference equations. The solutions for two physically relevant cases are found and expressed as Stieltjes Wigert polynomials.

Generalized Jacobi polynomials and Selberg integrals. (Polynômes de Jacobi généralisés et intégrales de Selberg.)

Barsky, Daniel, Carpentier, Michel (1996)

The Electronic Journal of Combinatorics [electronic only]

Generalized Krawtchouk polynomials: New properties

Norris Sookoo (2000)

Archivum Mathematicum

Orthogonality conditions and recurrence relations are presented for generalized Krawtchouk polynomials. Coefficients are evaluated for the expansion of an arbitrary polynomial in terms of these polynomials and certain special values for generalized Krawtchouk polynomials are obtained. Summations of some of these polynomials and of certain products are also considered.

Generalized Lauricella Functions with Different Multiplicities

H. M. Srivastava, M. C. Daoust (1973)

Δελτίο της Ελληνικής Μαθηματικής Εταιρίας

Generalized Legendre polynomials.

Asmus L. Schmidt (1990)

Journal für die reine und angewandte Mathematik

Generalized Neumann and Kapteyn expansions.

Exton, Harold (1995)

Journal of Applied Mathematics and Stochastic Analysis

Generalized Picard lattices arising from half-integral conditions

G. D. Mostow (1986)

Publications Mathématiques de l'IHÉS

Generalized reciprocity laws for sums of harmonic numbers.

Kuba, Markus, Prodinger, Helmut, Schneider, Carsten (2008)

Integers

Generalized trigonometric functions in complex domain

Petr Girg, Lukáš Kotrla (2015)

Mathematica Bohemica

We study extension of $p$ -trigonometric functions ${sin}_{p}$ and ${cos}_{p}$ to complex domain. For $p = 4, 6, 8, \dots$ , the function ${sin}_{p}$ satisfies the initial value problem which is equivalent to (*) $- {(u^{'})}^{p - 2} u^{''} - u^{p - 1} = 0, u (0) = 0, u^{'} (0) = 1$ in $ℝ$ . In our recent paper, Girg, Kotrla (2014), we showed that ${sin}_{p} (x)$ is a real analytic function for $p = 4, 6, 8, \dots$ on $(- π_{p} / 2, π_{p} / 2)$ , where $π_{p} / 2 = \int_{0}^{1} {(1 - s^{p})}^{- 1 / p}$ . This allows us to extend ${sin}_{p}$ to complex domain by its Maclaurin series convergent on the disc ${z \in ℂ : | z | < π_{p} / 2}$ . The question is whether this extensions ${sin}_{p} (z)$ satisfies (*) in the sense of differential equations in complex domain. This interesting...

Generating function and orthogonality property of a class of polynomials occurring in quantum mechanics

S.D. Bajpai (1994)

Annales mathématiques Blaise Pascal

Generating function identities for $ζ (2 n + 2)$ , $ζ (2 n + 3)$ via the WZ method.

Hessami Pilehrood, Kh., Hessami Pilehrood, T. (2008)

The Electronic Journal of Combinatorics [electronic only]

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