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Displaying 1 – 14 of 14

Deformed Heisenberg algebra with reflection and $d$ -orthogonal polynomials

Fethi Bouzeffour, Hanen Ben Mansour, Ali Zaghouani (2017)

Czechoslovak Mathematical Journal

This paper is devoted to the study of matrix elements of irreducible representations of the enveloping deformed Heisenberg algebra with reflection, motivated by recurrence relations satisfied by hypergeometric functions. It is shown that the matrix elements of a suitable operator given as a product of exponential functions are expressed in terms of $d$ -orthogonal polynomials, which are reduced to the orthogonal Meixner polynomials when $d = 1$ . The underlying algebraic framework allowed a systematic derivation...

Degenerate series representations of the $q$ -deformed algebra ${so}_{q}^{'} (r, s)$ .

Groza, Valentyna A. (2007)

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

Démonstration «automatique» d'identités et fonctions hypergéométriques

Pierre Cartier (1991/1992)

Séminaire Bourbaki

Determinant expressions for $q$ -harmonic congruences and degenerate Bernoulli numbers.

Dilcher, Karl (2008)

The Electronic Journal of Combinatorics [electronic only]

Développements asymptotiques $q$ -Gevrey et séries $G q$ -sommables

Changgui Zhang (1999)

Annales de l'institut Fourier

Nous donnons une version $q$ -analogue de l’asymptotique Gevrey et de la sommabilité de Borel, dues respectivement à G. Watson et E. Borel et systématiquement développées depuis une quinzaine d’années par J.-P. Ramis, Y. Sibuya, etc. Le but de ces auteurs était l’étude des équations différentielles dans le champ complexe. De même notre but est l’étude des équations aux $q$ -différences dans le champ complexe, dans la ligne de G.D. Birkhoff et W.J. Trjitzinsky.Plus précisément, nous introduisons une nouvelle...

Différentielles non commutatives et théorie de Galois différentielle ou aux différences

Yves André (2001)

Annales scientifiques de l'École Normale Supérieure

Discretized representations of harmonic variables by bilateral Jacobi operators.

Ruffing, Andreas (2000)

Discrete Dynamics in Nature and Society

Divisors, partitions and some new q-series identities

Alexander E. Patkowski (2009)

Colloquium Mathematicae

We obtain new q-series identities that have interesting interpretations in terms of divisors and partitions. We present a proof of a theorem of Z. B. Wang, R. Fokkink, and W. Fokkink, which follows as a corollary to our main q-series identity, and offer a similar result.

Currently displaying 1 – 14 of 14

Page 1

Displaying 1 – 14 of 14

Deformed Heisenberg algebra with reflection and $d$ -orthogonal polynomials

Degenerate series representations of the $q$ -deformed algebra ${so}_{q}^{'} (r, s)$ .

Démonstration «automatique» d'identités et fonctions hypergéométriques

Determinant expressions for $q$ -harmonic congruences and degenerate Bernoulli numbers.

Développements asymptotiques $q$ -Gevrey et séries $G q$ -sommables

Différentielles non commutatives et théorie de Galois différentielle ou aux différences

Discretized representations of harmonic variables by bilateral Jacobi operators.

Divisors, partitions and some new q-series identities

Double affine Hecke algebras of rank 1 and the $ℤ_{3}$ -symmetric Askey-Wilson relations.

Doubles mélanges des polylogarithmes multiples aux racines de l’unité

Dual pairs, spherical harmonics and a Capelli identity in quantum group theory

Duality of $q$ -polynomials, orthogonal on countable sets of points.

Dunkl operators

Dynamical $ℛ$ matrices of elliptic quantum groups and connection matrices for the $q$ -KZ equations.

Currently displaying 1 – 14 of 14