Your search keyword '"Askey–Wilson polynomials"' showing total 559 results

1. New proofs of theorems on <italic>q</italic>-orthogonal functions.

Author

Chen, Dandan and Liu, Zhiguo

Abstract

In this paper, we establish a q-integral formula by using the orthogonality relation, and also provide a new proof of the q-orthogonality relation for the continuous q-ultraspherical polynomials. A new q-beta integral with five parameters is evaluated. [ABSTRACT FROM AUTHOR]

Published

2024

2. From continuous to discrete: weak limit of normalized Askey–Wilson measure.

Author

Dai, Dan, Ismail, Mourad E. H., and Wang, Xiang-Sheng

Abstract

In this paper, we consider the weak limit of the normalized measure for Askey–Wilson polynomials when the parameter q approaches - 1 from the right. We use two different methods to prove that the weak limit is a discrete measure with two mass points that are symmetric about the origin. The weights on these two mass points are, however, not always the same. We also calculate the weak limit of the q-ultraspherical measure when q approaches a complex root of unity. [ABSTRACT FROM AUTHOR]

Published

2024

3. Moments of orthogonal polynomials and exponential generating functions.

Author

Gessel, Ira M. and Zeng, Jiang

Abstract

Starting from the moment sequences of classical orthogonal polynomials we derive the orthogonality purely algebraically. We consider also the moments of ( q = 1 ) classical orthogonal polynomials, and study those cases in which the exponential generating function has a nice form. In the opposite direction, we show that the generalized Dumont–Foata polynomials with six parameters are the moments of rescaled continuous dual Hahn polynomials. Finally, we show that one of our methods can be applied to deal with the moments of Askey–Wilson polynomials. [ABSTRACT FROM AUTHOR]

Published

2023

4. Specializing Koornwinder polynomials to Macdonald polynomials of type B, C, D and BC.

Author

Yamaguchi, Kohei and Yanagida, Shintarou

Abstract

We study the specializations of parameters in Koornwinder polynomials to obtain Macdonald polynomials associated to the subsystems of the affine root system of type (C n ∨ , C n) in the sense of Macdonald (Affine Hecke algebras and orthogonal polynomials, Cambridge tracts in mathematics, Cambridge Univ Press, 2003), and summarize them in what we call the specialization table. As a verification of our argument, we check the specializations to type B, C and D via Ram–Yip type formulas of non-symmetric Koornwinder and Macdonald polynomials. [ABSTRACT FROM AUTHOR]

Published

2023

5. Properties of Certain Classes of Semiclassical Orthogonal Polynomials

Author

Jordaan, Kerstin, Foupouagnigni, Mama, editor, and Koepf, Wolfram, editor

Published

2020

6. On Another Characterization of Askey-Wilson Polynomials.

Author

Mbouna, D. and Suzuki, A.

Abstract

In this paper we show that the only sequences of orthogonal polynomials (P n) n ≥ 0 satisfying ϕ (x) D q P n (x) = a n S q P n + 1 (x) + b n S q P n (x) + c n S q P n - 1 (x) , ( c n ≠ 0 ) where ϕ is a well chosen polynomial of degree at most two, D q is the Askey-Wilson operator and S q the averaging operator, are the multiple of Askey-Wilson polynomials, or specific or limiting cases of them. [ABSTRACT FROM AUTHOR]

Published

2022

7. Remarks on Askey–Wilson polynomials and Meixner polynomials of the second kind.

Author

Castillo, K., Mbouna, D., and Petronilho, J.

Abstract

The purpose of this note is to characterize all the sequences of orthogonal polynomials (P n) n ≥ 0 such that ▵ ▵ x (s - 1 / 2) P n + 1 (x (s - 1 / 2)) = c n (▵ + 2 I) P n (x (s - 1 / 2)) , where I is the identity operator, x defines a class of lattices with, generally, nonuniform step-size, and ▵ f (s) = f (s + 1) - f (s) . The proposed method can be applied to similar and to more general problems involving the mentioned operators, in order to obtain new characterization theorems for some specific families of classical orthogonal polynomials on lattices. [ABSTRACT FROM AUTHOR]

Published

2022

8. On the families of polynomials forming a part of the Askey–Wilson scheme and their probabilistic applications.

Author

Szabłowski, Paweł J.

Subjects

*POLYNOMIALS, *GAUSSIAN distribution, *FAMILIES, *CHEBYSHEV polynomials, *ORTHOGONAL polynomials, *GENERALIZATION

Abstract

In this paper, we review the properties of six families of orthogonal polynomials that form the main bulk of the collection called the Askey–Wilson scheme of polynomials. We give connection coefficients between them as well as the so-called linearization formulae and other useful important finite and infinite expansions and identities. An important part of the paper is the presentation of probabilistic models where most of these families of polynomials appear. These results were scattered within the literature in recent 15 years. We put them together to enable an overall outlook on these families and understand their crucial rôle in the attempts to generalize Gaussian distributions and find their bounded support generalizations. This paper is based on 65 items in the predominantly recent literature. [ABSTRACT FROM AUTHOR]

Published

2022

9. On the Askey--Wilson polynomials and a q-beta integral.

Author

Liu, Zhi-Guo

Abstract

A proof of the orthogonality relation for the Askey–Wilson polynomials is given by using a generating function for the Askey–Wilson polynomials and the uniqueness of a rational function expansion. We further use the orthogonality relation for the Askey–Wilson polynomials and a q-series transformation formula to evaluate a general q-beta integral with eight parameters. The integrand of this q-beta integral is the product of two terminating 5φ4 series and the value is a 10φ9 series. [ABSTRACT FROM AUTHOR]

Published

2021

10. q-fractional integral operators with two parameters.

Author

Ismail, Mourad E.H. and Zhou, Keru

Subjects

*POLYNOMIAL operators, *LINEAR operators, *GENERATING functions, *INTEGRAL operators, *DIFFERENCE operators, *POLYNOMIALS

Abstract

We use the Poisson kernel of the continuous q -Hermite polynomials to introduce families of integral operators. One of them is semigroups of linear operators. We describe the eigenvalues and eigenfunctions of one family of operators. The action of the semigroups of operators on the Askey–Wilson polynomials is shown to only change the parameters but preserves the degrees, hence we produce transmutation relations for the Askey–Wilson polynomials. The transmutation relations are then used to derive bilinear generating functions involving the Askey–Wilson polynomials. [ABSTRACT FROM AUTHOR]

Published

2024

11. On the generalized Kesten–McKay distributions.

Author

Szabłowski, Paweł J.

Subjects

*ORTHOGONAL polynomials, *CHEBYSHEV polynomials, *POLYNOMIALS, *MULTIVARIATE analysis

Abstract

We examine the properties of distributions with the density of the form: 2 A n c n - 2 c 2 - x 2 π ∏ j = 1 n (c (1 + a j 2 ) - 2 a j x) , where c, a1, ..., an are some parameters and An a suitable constant. We find general forms of An, of k-th moment and of k-th polynomial orthogonal with respect to such measures. We also calculate Cauchy transforms of these measures. We indicate connections of such distributions with distributions and polynomials forming the so called Askey–Wilson scheme. On the way we prove several identities concerning rational symmetric functions. Finally, we consider the case of parameters a1, ..., an forming conjugate pairs and give some multivariate interpretations based on the obtained distributions at least for the cases n = 2, 4, 6. [ABSTRACT FROM AUTHOR]

Published

2020

12. GRADIENT SYSTEM FOR THE ROOTS OF THE ASKEY-WILSON POLYNOMIAL.

Author

VAN DIEJEN, J. F.

Subjects

*POLYNOMIALS, *CONVEX functions, *ORTHOGONAL polynomials, *MATHEMATICS

Abstract

Recently, it was observed that the roots of the Askey-Wilson polynomial are retrieved at the unique global minimum of an associated strictly convex Morse function [J. F. van Diejen and E. Emsiz, Lett. Math. Phys. 109 (2019), pp. 89-112]. The purpose of the present note is to infer that the corresponding gradient flow converges to the roots in question at an exponential rate. [ABSTRACT FROM AUTHOR]

Published

2019

13. On Matrix Product Ansatz for Asymmetric Simple Exclusion Process with Open Boundary in the Singular Case.

Author

Bryc, Włodzimierz and Świeca, Marcin

Subjects

*MATRIX multiplications, *LINEAR algebra, *ALGEBRA, *SUBSTITUTE products, *POLYNOMIALS, *ABSTRACT algebra

Abstract

We study a substitute for the matrix product ansatz for asymmetric simple exclusion process with open boundary in the "singular case" α β = q N γ δ , when the standard form of the matrix product ansatz of Derrida et al. (J Phys A 26(7):1493–1517, 1993) does not apply. In our approach, the matrix product ansatz is replaced with a pair of linear functionals on an abstract algebra. One of the functionals, φ 1 , is defined on the entire algebra, and determines stationary probabilities for large systems on L ≥ N + 1 sites. The other functional, φ 0 , is defined only on a finite-dimensional linear subspace of the algebra, and determines stationary probabilities for small systems on L < N + 1 sites. Functional φ 0 vanishes on non-constant Askey–Wilson polynomials and in non-singular case becomes an orthogonality functional for the Askey–Wilson polynomials. [ABSTRACT FROM AUTHOR]

Published

2019

14. ASKEY-WILSON POLYNOMIALS AND A DOUBLE q-SERIES TRANSFORMATION FORMULA WITH TWELVE PARAMETERS.

Author

ZHI-GUO LIU

Subjects

*ORTHOGONAL polynomials, *INTEGRAL representations, *POLYNOMIALS, *EULER polynomials, *EULER characteristic

Abstract

The Askey-Wilson polynomials are the most general classical orthogonal polynomials that are known, and the Nassrallah-Rahman integral is a very general extension of Euler's integral representation of the classical 2F1 function. Based on a q-series transformation formula and the Nassrallah-Rahman integral we prove a q-beta integral which has twelve parameters, with several other results, both classical and new, included as special cases. This q-beta integral also allows us to derive a curious double q-series transformation formula, which includes one formula of Al-Salam and Ismail as a special case. [ABSTRACT FROM AUTHOR]

Published

2019

15. On exponential and trigonometric functions on nonuniform lattices.

Author

Kenfack Nangho, M., Foupouagnigni, M., and Koepf, W.

Abstract

We develop analogs of exponential and trigonometric functions (including the basic exponential function) and derive their fundamental properties: addition formula, positivity, reciprocal and fundamental relations of trigonometry. We also establish a binomial theorem, characterize symmetric orthogonal polynomials and provide a formula for computing the nth-derivatives for analytic functions on nonuniform lattices (q-quadratic and quadratic variables). [ABSTRACT FROM AUTHOR]

Published

2019

16. Remarks on Askey–Wilson polynomials and Meixner polynomials of the second kind

Author

J. Petronilho, D. Mbouna, and K. Castillo

Subjects

Combinatorics, Classical orthogonal polynomials, Identity (mathematics), Algebra and Number Theory, Number theory, Orthogonal polynomials, Order (ring theory), Characterization (mathematics), Meixner polynomials, Askey–Wilson polynomials, Mathematics

Abstract

The purpose of this note is to characterize all the sequences of orthogonal polynomials $$(P_n)_{n\ge 0}$$ such that $$\begin{aligned} \frac{\triangle }{\mathbf{\triangle } x(s-1/2)}P_{n+1}(x(s-1/2))=c_n(\triangle +2\,\mathrm {I})P_n(x(s-1/2)), \end{aligned}$$ where $$\,\mathrm {I}$$ is the identity operator, x defines a class of lattices with, generally, nonuniform step-size, and $$\triangle f(s)=f(s+1)-f(s)$$ . The proposed method can be applied to similar and to more general problems involving the mentioned operators, in order to obtain new characterization theorems for some specific families of classical orthogonal polynomials on lattices.

Published

2021

17. ON COMPLETE MONOTONICITY OF CERTAIN SPECIAL FUNCTIONS.

Author

RUIMING ZHANG

Subjects

*MONOTONIC functions, *REAL variables, *LAGUERRE polynomials, *ORTHOGONAL polynomials, *BESSEL beams

Abstract

Given an entire function f(z) that has only negative zeros, we shall prove that all the functions of type f(m)(x)/f(n)(x), m > n are completely monotonic. Examples of this type are given for Laguerre polynomials, ultraspherical polynomials, Jacobi polynomials, Stieltjes-Wigert polynomials, q-Laguerre polynomials, Askey-Wilson polynomials, Ramanujan function, qexponential functions, q-Bessel functions, Euler's gamma function, Airy function, modified Bessel functions of the first and the second kind, and the confluent basic hypergeometric series. [ABSTRACT FROM AUTHOR]

Published

2018

18. Combinatorics of the two-species ASEP and Koornwinder moments.

Author

Corteel, Sylvie, Mandelshtam, Olya, and Williams, Lauren

Subjects

*COMBINATORICS, *TRAFFIC flow, *ORTHOGONAL polynomials, *GENERALIZATION

Abstract

In previous work [12–14] , the first and third authors introduced staircase tableaux, which they used to give combinatorial formulas for the stationary distribution of the asymmetric simple exclusion process (ASEP) and for the moments of the Askey–Wilson weight function. The fact that the ASEP and Askey–Wilson moments are related at all is unexpected, and is due to [45] . The ASEP is a model of particles hopping on a one-dimensional lattice of N sites with open boundaries; particles can enter and exit at both left and right borders. It was introduced around 1970 [34,43] and is cited as a model for both traffic flow and translation in protein synthesis. Meanwhile, the Askey–Wilson polynomials are a family of orthogonal polynomials in one variable which sit at the top of the hierarchy of classical orthogonal polynomials. So from this previous work, we have the relationship ASEP −− staircase tableaux −− Askey–Wilson moments. The Askey–Wilson polynomials can be viewed as the one-variable case of the multivariate Koornwinder polynomials, which are also known as the Macdonald polynomials attached to the non-reduced affine root system ( C n ∨ , C n ). It is natural then to ask whether one can generalize the relationships among the ASEP, Askey–Wilson moments, and staircase tableaux, in such a way that Koornwinder moments replace Askey–Wilson moments. In [15] , we made a precise link between Koornwinder moments and the two-species ASEP , a generalization of the ASEP which has two species of particles with different “weights.” In this article we introduce rhombic staircase tableaux , and show that we have the relationship 2-species ASEP −− rhombic staircase tableaux −− Koornwinder moments. In particular, we give formulas for the stationary distribution of the two-species ASEP and for Koornwinder moments, in terms of rhombic staircase tableaux. [ABSTRACT FROM AUTHOR]

Published

2017

19. On the Askey–Wilson polynomials and a $q$-beta integral

Author

Zhi-Guo Liu

Subjects

Applied Mathematics, General Mathematics, Askey–Wilson polynomials, Mathematics, Mathematical physics

Published

2021

20. Nonterminating transformations and summations associated with some q-Mellin–Barnes integrals.

Author

Cohl, Howard S. and Costas-Santos, Roberto S.

Subjects

*HYPERGEOMETRIC series, *THETA functions, *HYPERGEOMETRIC functions, *INTEGRALS, *INTEGRAL representations

Abstract

In many cases one may encounter an integral which is of q -Mellin–Barnes type. These integrals are easily evaluated using theorems which have a long history dating back to Slater, Askey, Gasper, Rahman and others. We derive some interesting q -Mellin–Barnes integrals and using them we derive transformation and summation formulas for nonterminating basic hypergeometric functions. The cases which we treat include ratios of theta functions, the Askey–Wilson moments, nonterminating well-poised ϕ 2 3 , nonterminating very-well-poised W 4 5 , W 7 8 , products of two nonterminating ϕ 1 2 's, square of a nonterminating well-poised ϕ 1 2 , a nonterminating W 9 10 , two nonterminating W 11 12 's and several nonterminating summations which arise from the Askey–Roy and Gasper integrals. [ABSTRACT FROM AUTHOR]

Published

2023

21. Expansions in Askey–Wilson polynomials via Bailey transform.

Author

Jia, Zeya and Zeng, Jiang

Subjects

*POLYNOMIALS, *MATHEMATICAL expansion, *INVERSIONS (Geometry), *MATHEMATICAL transformations, *INTEGRALS

Abstract

We prove a general expansion formula in Askey–Wilson polynomials using Bailey transform and Bressoud inversion. As applications, we give new proofs and generalizations of some recent results of Ismail–Stanton and Liu. Moreover, we prove a new q -beta integral formula involving Askey–Wilson polynomials, which includes the Nassrallah–Rahman integral as a special case. We also give a bootstrapping proof of Ismail–Stanton's recent generating function of Askey–Wilson polynomials. [ABSTRACT FROM AUTHOR]

Published

2017

22. On Solutions of Holonomic Divided-Difference Equations on Nonuniform Lattices

Author

Salifou Mboutngam, Maurice Kenfack-Nangho, Mama Foupouagnigni, and Wolfram Koepf

Subjects

Askey-Wilson polynomials, nonuniform lattices, difference equations, divided-difference equations, Stieltjes function, Mathematics, QA1-939

Abstract

The main aim of this paper is the development of suitable bases that enable the direct series representation of orthogonal polynomial systems on nonuniform lattices (quadratic lattices of a discrete or a q-discrete variable). We present two bases of this type, the first of which allows one to write solutions of arbitrary divided-difference equations in terms of series representations, extending results given by Sprenger for the q-case. Furthermore, it enables the representation of the Stieltjes function, which has already been used to prove the equivalence between the Pearson equation for a given linear functional and the Riccati equation for the formal Stieltjes function. If the Askey-Wilson polynomials are written in terms of this basis, however, the coefficients turn out to be not q-hypergeometric. Therefore, we present a second basis, which shares several relevant properties with the first one. This basis enables one to generate the defining representation of the Askey-Wilson polynomials directly from their divided-difference equation. For this purpose, the divided-difference equation must be rewritten in terms of suitable divided-difference operators developed in previous work by the first author.

Published

2013

23. On the generalized Kesten–McKay distributions

Author

Paweł J. Szabłowski

Subjects

Statistics and Probability, Pure mathematics, Chebyshev polynomials, Polynomial, 010102 general mathematics, Cauchy distribution, 01 natural sciences, Askey–Wilson polynomials, Symmetric function, Moment (mathematics), 010104 statistics & probability, Orthogonal polynomials, 0101 mathematics, Constant (mathematics), Mathematics

Abstract

We examine the properties of distributions with the density of the form: [see formula in PDF] wherec,a1, …,anare some parameters andAna suitable constant. We find general forms ofAn, ofk-th moment and ofk-th polynomial orthogonal with respect to such measures. We also calculate Cauchy transforms of these measures. We indicate connections of such distributions with distributions and polynomials forming the so called Askey–Wilson scheme. On the way we prove several identities concerning rational symmetric functions. Finally, we consider the case of parametersa1, …,anforming conjugate pairs and give some multivariate interpretations based on the obtained distributions at least for the casesn= 2, 4, 6.

Published

2020

24. Efficient algorithms for construction of recurrence relations for the expansion and connection coefficients in series of quantum classical orthogonal polynomials

Author

Eid H. Doha and Hany M. Ahmed

Subjects

q-classical orthogonal polynomials, Askey–Wilson polynomials, q-difference equations, Fourier coefficients, Recurrence relations, Connection problem, Medicine (General), R5-920, Science (General), Q1-390

Abstract

Formulae expressing explicitly the q-difference derivatives and the moments of the polynomials Pn(x ; q) ∈ T (T ={Pn(x ; q) ∈ Askey–Wilson polynomials: Al-Salam-Carlitz I, Discrete q-Hermite I, Little (Big) q-Laguerre, Little (Big) q-Jacobi, q-Hahn, Alternative q-Charlier) of any degree and for any order in terms of Pi(x ; q) themselves are proved. We will also provide two other interesting formulae to expand the coefficients of general-order q-difference derivatives Dqpf(x), and for the moments xℓDqpf(x), of an arbitrary function f(x) in terms of its original expansion coefficients. We used the underlying formulae to relate the coefficients of two different polynomial systems of basic hypergeometric orthogonal polynomials, belonging to the Askey–Wilson polynomials and Pn(x ; q) ∈ T. These formulae are useful in setting up the algebraic systems in the unknown coefficients, when applying the spectral methods for solving q-difference equations of any order.

Published

2010

25. Solutions to the Associated q-Askey-Wilson Polynomial Recurrence Relation

Author

Gupta, Dharma P., Masson, David R., Hoffmann, K.-H., editor, Mittelmann, H. D., editor, and Zahar, R. V. M., editor

Published

1994

26. Properties of the zeros of the polynomials belonging to the q-Askey scheme.

Author

Bihun, Oksana and Calogero, Francesco

Subjects

*ZERO (The number), *POLYNOMIALS, *SCHEMES (Algebraic geometry), *DIOPHANTINE analysis, *MATRICES (Mathematics)

Abstract

In this paper we provide properties—which are, to the best of our knowledge, new—of the zeros of the polynomials belonging to the q -Askey scheme. These findings include Diophantine relations satisfied by these zeros when the parameters characterizing these polynomials are appropriately restricted. [ABSTRACT FROM AUTHOR]

Published

2016

27. Quantum groups and Askey-Wilson polynomials

Author

Wagenaar, Carel (author) and Wagenaar, Carel (author)

Abstract

In this thesis, we introduce the quantum groups Uq(SL(2,C)) and Aq(SL(2,C)) as Hopf algebras. We study their representations, including their similarities and differences with the classical theory. We show that the eigenvectors of Koorwinder's twisted primitive elements of Uq(SU(2)) are dual q-Krawtchouk polynomials. We use this explicit expression to define generalised matrix elements and spherical functions in Aq(SL(2,C)). Then we use the Haar functional to show that these generalised matrix elements are Askey-Wilson polynomials with two continuous and two discrete parameters. Next, we show a new result. Namely, two twisted primitive elements of Uq(SL(2,C)) generate Zhedanov's Askey-Wilson algebra AW(3). Consequently, AW(3) is embedded as a subalgebra into Uq(SL(2,C)). We use this to show that overlap functions of twisted primitive elements in Uq(SU(2)) are q-Racah polynomials. With that, we derive a summation formula connecting q-Racah and dual q-Krawtchouk polynomials., Applied Mathematics

Published

2021

28. Gradient system for the roots of the Askey-Wilson polynomial

Author

J. F. van Diejen

Subjects

Polynomial, Pure mathematics, Applied Mathematics, General Mathematics, Gradient system, Balanced flow, Askey–Wilson polynomials, Mathematics

Abstract

Recently, it was observed that the roots of the Askey-Wilson polynomial are retrieved at the unique global minimum of an associated strictly convex Morse function [J. F. van Diejen and E. Emsiz, Lett. Math. Phys. 109 (2019), pp. 89–112]. The purpose of the present note is to infer that the corresponding gradient flow converges to the roots in question at an exponential rate.

Published

2019

29. A characterization of Askey-Wilson polynomials

Author

Maurice Kenfack Nangho and Kerstin Jordaan

Subjects

Algebra, Applied Mathematics, General Mathematics, Orthogonal polynomials, Foundation (engineering), Characterization (mathematics), Askey–Wilson polynomials, Mathematics

Abstract

The research of the first author was supported by a Vice-Chancellor’s Postdoctoral Fellowship from the University of Pretoria. The research by the second author was partially supported by the National Research Foundation of South Africa under grant number 108763.

Published

2019

30. Askey–Wilson polynomials and a double $q$-series transformation formula with twelve parameters

Author

Zhi-Guo Liu

Subjects

Pure mathematics, Series (mathematics), Applied Mathematics, General Mathematics, Mathematics::Classical Analysis and ODEs, Extension (predicate logic), Function (mathematics), Askey–Wilson polynomials, Classical orthogonal polynomials, symbols.namesake, Transformation (function), Euler's formula, symbols, Special case, Mathematics

Abstract

The Askey--Wilson polynomials are the most general classical orthogonal polynomials that are known and the Nassrallah--Rahman integral is a very general extension of Euler's integral representation of the classical $_2F_1$ function. Based on a $q$-series transformation formula and the Nassrallah--Rahman integral we prove a $q$--beta integral which has twelve parameters, with several other results, both classical and new, included as special cases. This $q$-beta integral also allows us to derive a curious double $q$--series transformation formula, which includes one formula of Al--Salam and Ismail as a special case

Published

2019

31. On the functional equation for classical orthogonal polynomials on lattices.

Author

Castillo, K., Mbouna, D., and Petronilho, J.

Published

2022

32. Casoratian identities for the Wilson and Askey–Wilson polynomials.

Author

Odake, Satoru and Sasaki, Ryu

Subjects

*POLYNOMIALS, *IDENTITIES (Mathematics), *DARBOUX transformations, *QUANTUM mechanics, *PARTIAL differential equations

Abstract

Infinitely many Casoratian identities are derived for the Wilson and Askey–Wilson polynomials in parallel to the Wronskian identities for the Hermite, Laguerre and Jacobi polynomials, which were reported recently by the present authors. These identities form the basis of the equivalence between eigenstate adding and deleting Darboux transformations for solvable (discrete) quantum mechanical systems. Similar identities hold for various reduced form polynomials of the Wilson and Askey–Wilson polynomials, e.g. the continuous q -Jacobi, continuous (dual) ( q -)Hahn, Meixner–Pollaczek, Al-Salam–Chihara, continuous (big) q -Hermite, etc. [ABSTRACT FROM AUTHOR]

Published

2015

33. Explicit matrix inverses for lower triangular matrices with entries involving Jacobi polynomials.

Author

Cagliero, Leandro and Koornwinder, Tom H.

Subjects

*JACOBI polynomials, *MATRICES (Mathematics), *PROBLEM solving, *PARAMETER estimation, *BIORTHOGONAL systems

Abstract

For a two-parameter family of lower triangular matrices with entries involving Jacobi polynomials an explicit inverse is given, with entries involving a sum of two Jacobi polynomials. The formula simplifies in the Gegenbauer case and then one choice of the parameter solves an open problem in a recent paper by Koelink, van Pruijssen & Román. The two-parameter family is closely related to two two-parameter groups of lower triangular matrices, of which we also give the explicit generators. Another family of pairs of mutually inverse lower triangular matrices with entries involving Jacobi polynomials, unrelated to the family just mentioned, was given by J. Koekoek & R. Koekoek (1999). We show that this last family is a limit case of a pair of connection relations between Askey–Wilson polynomials having one of their four parameters in common. [ABSTRACT FROM AUTHOR]

Published

2015

34. A QUADRATIC FORMULA FOR BASIC HYPERGEOMETRIC SERIES RELATED TO ASKEY-WILSON POLYNOMIALS.

Author

GUO, VICTOR J. W., MASAO ISHIKAWA, HIROYUKI TAGAWA, and JIANG ZENG

Subjects

*QUADRATIC equations, *HYPERGEOMETRIC series, *POLYNOMIALS, *MATHEMATICAL proofs, *INTERPOLATION, *PFAFFIAN problem

Abstract

We prove a general quadratic formula for basic hypergeometric series, from which simple proofs of several recent determinant and Pfaffian formulas are obtained. A special case of the quadratic formula is actually related to a Gram determinant formula for Askey-Wilson polynomials. We also show how to derive a recent double-sum formula for the moments of Askey-Wilson polynomials from Newton's interpolation formula [ABSTRACT FROM AUTHOR]

Published

2015

35. Expansions in the Askey–Wilson polynomials.

Author

Ismail, Mourad E.H. and Stanton, Dennis

Subjects

*POLYNOMIALS, *HYPERGEOMETRIC functions, *GENERATING functions, *MATHEMATICAL functions, *JACOBI method, *MATHEMATICAL analysis

Abstract

We give a general expansion formula of functions in the Askey–Wilson polynomials and using Askey–Wilson orthogonality we evaluate several integrals. Moreover we give a general expansion formula of functions in polynomials of Askey–Wilson type, which are not necessarily orthogonal. Limiting cases give expansions in little and big q -Jacobi type polynomials. We also give a new generating function for Askey–Wilson polynomials and a new evaluation for specialized Askey–Wilson polynomials. [ABSTRACT FROM AUTHOR]

Published

2015

36. The q‐Bannai–Ito algebra and multivariate (−q)‐Racah and Bannai–Ito polynomials

Author

Hadewijch De Clercq and Hendrik De Bie

Subjects

33C50, Rank (linear algebra), 33D50, 39A13, General Mathematics, SYMMETRY, FOS: Physical sciences, Askey–Wilson polynomials, 01 natural sciences, 81R50 (primary), Orthogonality, Askey scheme, ASKEY-WILSON POLYNOMIALS, SYSTEMS, Mathematics - Quantum Algebra, 0103 physical sciences, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Bannai–Ito algebra, Quantum Algebra (math.QA), 0101 mathematics, Connection (algebraic framework), Algebraic number, Abelian group, Mathematical Physics, multivariate polynomials, Askey–Wilson algebra, Mathematics, 33C50, 33D45, 33D50, 33D80, 39A13, 81R50, bispectrality, OPERATORS, Conjecture, q-Racah polynomials, 010102 general mathematics, 33D80, Mathematical Physics (math-ph), Algebra, Mathematics and Statistics, Mathematics - Classical Analysis and ODEs, Orthogonal polynomials, Bannai–Ito polynomials, 010307 mathematical physics, 33D45 (secondary), Realization (systems), QUANTUM, COEFFICIENTS

Abstract

The Gasper and Rahman multivariate $(-q)$-Racah polynomials appear as connection coefficients between bases diagonalizing different abelian subalgebras of the recently defined higher rank $q$-Bannai-Ito algebra $\mathcal{A}_n^q$. Lifting the action of the algebra to the connection coefficients, we find a realization of $\mathcal{A}_n^q$ by means of difference operators. This provides an algebraic interpretation for the bispectrality of the multivariate $(-q)$-Racah polynomials, as was established in [Iliev, Trans. Amer. Math. Soc. 363 (3) (2011), 1577-1598]. Furthermore, we extend the Bannai-Ito orthogonal polynomials to multiple variables and use these to express the connection coefficients for the $q = 1$ higher rank Bannai-Ito algebra $\mathcal{A}_n$, thereby proving a conjecture from [De Bie et al., Adv. Math. 303 (2016), 390-414]. We derive the orthogonality relation of these multivariate Bannai-Ito polynomials and provide a discrete realization for $\mathcal{A}_n$., 61 pages, added more details on construction of bases in section 2.3 and 2.4, various other small changes

Published

2021

37. Moments of Askey-Wilson polynomials

Author

Jang Soo Kim and Dennis Stanton

Subjects

askey-wilson polynomials, moments of orthogonal polynomials, motzkin paths, hypergeometric series, [info.info-dm]computer science [cs]/discrete mathematics [cs.dm], Mathematics, QA1-939

Abstract

New formulas for the $n^{\mathrm{th}}$ moment $\mu_n(a,b,c,d;q)$ of the Askey-Wilson polynomials are given. These are derived using analytic techniques, and by considering three combinatorial models for the moments: Motzkin paths, matchings, and staircase tableaux. A related positivity theorem is given and another one is conjectured.

Published

2013

38. A general q-inverse series relation

Author

Dave, B. I.

Published

2018

39. Moments of Askey–Wilson polynomials.

Author

Kim, Jang Soo and Stanton, Dennis

Subjects

*POLYNOMIALS, *MATHEMATICAL formulas, *COMBINATORICS, *MATHEMATICAL models, *PATHS & cycles in graph theory, *LOGICAL prediction

Abstract

Abstract: New formulas for the nth moment of the Askey–Wilson polynomials are given. These are derived using analytic techniques, and by considering three combinatorial models for the moments: Motzkin paths, matchings, and staircase tableaux. A related positivity theorem is given and another one is conjectured. [Copyright &y& Elsevier]

Published

2014

40. Terminating Basic Hypergeometric Representations and Transformations for the Askey–Wilson Polynomials

Author

Linus Ge, Roberto S. Costas-Santos, and Howard S. Cohl

Subjects

Basic hypergeometric series, Pure mathematics, Physics and Astronomy (miscellaneous), General Mathematics, lcsh:Mathematics, Mathematics::Classical Analysis and ODEs, basic hypergeometric series, lcsh:QA1-939, Hypergeometric distribution, Askey–Wilson polynomials, basic hypergeometric orthogonal polynomials, basic hypergeometric transformations, Mathematics - Classical Analysis and ODEs, Chemistry (miscellaneous), Mathematics::Quantum Algebra, Computer Science (miscellaneous), Classical Analysis and ODEs (math.CA), FOS: Mathematics, Computer Science::Symbolic Computation, Mathematics

Abstract

In this survey paper, we exhaustively explore the terminating basic hypergeometric representations of the Askey-Wilson polynomials and the corresponding terminating basic hypergeometric transformations that these polynomials satisfy. From the terminating basic hypergeometric representations of these polynomials, and due to symmetry in their free parameters, we are able to exhaustively explore the terminating basic hypergeometric transformation formulae which these polynomials satisfy., Comment: 14 pages

Published

2020

41. An Eigenvalue Problem for the Associated Askey–Wilson Polynomials

Author

Christian Krattenthaler, Andrea Bruder, and Sergei K. Suslov

Subjects

Classical orthogonal polynomials, Algebra, Macdonald polynomials, Difference polynomials, Mathematics::Quantum Algebra, High Energy Physics::Lattice, Discrete orthogonal polynomials, Orthogonal polynomials, Wilson polynomials, Mathematics::Classical Analysis and ODEs, Koornwinder polynomials, Askey–Wilson polynomials, Mathematics

Abstract

To derive an eigenvalue problem for the associated Askey–Wilson polynomials, we consider an auxiliary function in two variables which is related to the associated Askey–Wilson polynomials introduced by Ismail and Rahman. The Askey–Wilson operator, applied in each variable separately, maps this function to the ordinary Askey–Wilson polynomials with different sets of parameters. A third Askey–Wilson operator is found with the help of a computer algebra program which links the two, and an eigenvalue problem is stated.

Published

2020

42. Properties of Certain Classes of Semiclassical Orthogonal Polynomials

Author

Kerstin Jordaan

Subjects

Combinatorics, Physics, Polynomial, symbols.namesake, Nonlinear difference equation, Orthogonal polynomials, symbols, Laguerre polynomials, Semiclassical physics, Jacobi polynomials, Askey–Wilson polynomials, Monic polynomial

Abstract

In this lecture we discuss properties of orthogonal polynomials for weights which are semiclassical perturbations of classical orthogonality weights. We use the moments, together with the connection between orthogonal polynomials and Painleve equations to obtain explicit expressions for the recurrence coefficients of polynomials associated with a semiclassical Laguerre and a generalized Freud weight. We analyze the asymptotic behavior of generalized Freud polynomials in two different contexts. We show that unique, positive solutions of the nonlinear difference equation satisfied by the recurrence coefficients exist for all real values of the parameter involved in the semiclassical perturbation but that these solutions are very sensitive to the initial conditions. We prove properties of the zeros of semiclassical Laguerre and generalized Freud polynomials and determine the coefficients an,n+j in the differential-difference equation $$\displaystyle x\frac {d}{dx}P_n(x)=\sum _{k=-1}^{0}a_{n,n+k}P_{n+k}(x), $$ where Pn(x) are the generalized Freud polynomials. Finally, we show that the only monic orthogonal polynomials \(\{P_n\}_{n=0}^{\infty }\) that satisfy $$\displaystyle \pi (x)\mathcal {D}_{q}^2P_{n}(x)=\sum _{j=-2}^{2}a_{n,n+j}P_{n+j}(x),\; x=\cos \theta ,\;~ a_{n,n-2}\neq 0,~ n=2,3,\dots , $$ where π(x) is a polynomial of degree at most 4 and \(\mathcal {D}_{q}\) is the Askey–Wilson operator, are Askey–Wilson polynomials and their special or limiting cases, using this relation to derive bounds for the extreme zeros of Askey–Wilson polynomials.

Published

2020

43. Degenerate Sklyanin algebras, Askey-Wilson polynomials and Heun operators

Author

Alexei Zhedanov, Julien Gaboriaud, Luc Vinet, and Satoshi Tsujimoto

Subjects

Statistics and Probability, Pure mathematics, Truncation, Mathematics::Classical Analysis and ODEs, General Physics and Astronomy, FOS: Physical sciences, 01 natural sciences, Askey–Wilson polynomials, Quadratic equation, Operator (computer programming), 0103 physical sciences, Mathematics - Quantum Algebra, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Quantum Algebra (math.QA), 33C45, 33C47, 81R50, 0101 mathematics, Mathematical Physics, Mathematics, Degree (graph theory), 010102 general mathematics, Degenerate energy levels, Statistical and Nonlinear Physics, Basis (universal algebra), Mathematical Physics (math-ph), Mathematics - Classical Analysis and ODEs, Modeling and Simulation, 010307 mathematical physics, Vector space

Abstract

The $q$-difference equation, the shift and the contiguity relations of the Askey-Wilson polynomials are cast in the framework of the three and four-dimensional degenerate Sklyanin algebras $\mathfrak{ska}_3$ and $\mathfrak{ska}_4$. It is shown that the $q$-para Racah polynomials corresponding to a non-conventional truncation of the Askey-Wilson polynomials form a basis for a finite-dimensional representation of $\mathfrak{ska}_4$. The first order Heun operators defined by a degree raising condition on polynomials are shown to form a five-dimensional vector space that encompasses $\mathfrak{ska}_4$. The most general quadratic expression in the five basis operators and such that it raises degrees by no more than one is identified with the Heun-Askey-Wilson operator., Comment: 19 pages, 32 references

Published

2020

44. On complete monotonicity of certain special functions

Author

Ruiming Zhang

Subjects

Pure mathematics, Applied Mathematics, General Mathematics, 010102 general mathematics, Monotonic function, 01 natural sciences, Askey–Wilson polynomials, 010101 applied mathematics, symbols.namesake, Airy function, Special functions, Orthogonal polynomials, symbols, 0101 mathematics, Bessel function, Mathematics

Abstract

Given an entire function f ( z ) f(z) that has only negative zeros, we shall prove that all the functions of type f ( m ) ( x ) / f ( n ) ( x ) , m > n f^{(m)}(x)/f^{(n)}(x),\ m>n are completely monotonic. Examples of this type are given for Laguerre polynomials, ultraspherical polynomials, Jacobi polynomials, Stieltjes-Wigert polynomials, q q -Laguerre polynomials, Askey-Wilson polynomials, Ramanujan function, q q -exponential functions, q q -Bessel functions, Euler’s gamma function, Airy function, modified Bessel functions of the first and the second kind, and the confluent basic hypergeometric series.

Published

2017

45. On Solutions of Holonomic Divided-Difference Equations on Nonuniform Lattices.

Author

Foupouagnigni, Mama, Koepf, Wolfram, Kenfack-Nangho, Maurice, and Mboutngam, Salifou

Subjects

*HOLONOMIC constraints, *CONSTRAINTS (Physics), *DIFFERENCE equations, *EQUATIONS, *LATTICE theory

Abstract

The main aim of this paper is the development of suitable bases that enable the direct series representation of orthogonal polynomial systems on nonuniform lattices (quadratic lattices of a discrete or a q-discrete variable). We present two bases of this type, the first of which allows one to write solutions of arbitrary divided-difference equations in terms of series representations, extending results given by Sprenger for the q-case. Furthermore, it enables the representation of the Stieltjes function, which has already been used to prove the equivalence between the Pearson equation for a given linear functional and the Riccati equation for the formal Stieltjes function. If the Askey-Wilson polynomials are written in terms of this basis, however, the coefficients turn out to be not q-hypergeometric. Therefore, we present a second basis, which shares several relevant properties with the first one. This basis enables one to generate the defining representation of the Askey-Wilson polynomials directly from their divided-difference equation. For this purpose, the divided-difference equation must be rewritten in terms of suitable divided-difference operators developed in previous work by the first author. [ABSTRACT FROM AUTHOR]

Published

2013

46. On the generalized Askey–Wilson polynomials.

Author

Álvarez-Nodarse, R. and Sevinik Adıgüzel, R.

Subjects

*GENERALIZATION, *POLYNOMIALS, *RECURSIVE sequences (Mathematics), *HYPERGEOMETRIC series, *REPRESENTATION theory, *MATHEMATICAL functions

Abstract

Abstract: In this paper, a generalization of Askey–Wilson polynomials is introduced. These polynomials are obtained from the Askey–Wilson polynomials via the addition of two mass points to the weight function of them at the points ±1. Several properties of such new family are considered, in particular, the three-term recurrence relation and the representation as basic hypergeometric series. [Copyright &y& Elsevier]

Published

2013

47. Connection and linearization coefficients of the Askey–Wilson polynomials

Author

Foupouagnigni, M., Koepf, W., and Tcheutia, D.D.

Subjects

*POLYNOMIALS, *LINEAR algebra, *COEFFICIENTS (Statistics), *MATHEMATICAL expansion, *CLEBSCH-Gordan coefficients, *FOURIER analysis, *ORTHOGONAL polynomials, *LATTICE theory

Abstract

Abstract: The linearization problem is the problem of finding the coefficients in the expansion of the product of two polynomial systems in terms of a third sequence of polynomials , The polynomials , and may belong to three different polynomial families. In the case , we get the (standard) linearization or Clebsch–Gordan-type problem. If , we are faced with the so-called connection problem. In this paper, we compute explicitly, in a more general setting and using an algorithmic approach, the connection and linearization coefficients of the Askey–Wilson orthogonal polynomial families. We find our results by an application of computer algebra. The major algorithmic tool for our development is a refined version of q-Petkovšekʼs algorithm published by Horn (2008), Horn et al. (2012) and implemented in Maple by Sprenger (2009), Sprenger and Koepf (2012) (in his package qFPS.mpl) which finds the q-hypergeometric term solutions of q-holonomic recurrence equations. The major ingredients which make this application non-trivial are [•] the use of appropriate operators and ; [•] the use of an appropriate basis for these operators; [•] and a suitable characterization of the classical orthogonal polynomials on a non-uniform lattice which was developed very recently (Foupouagnigni et al., 2011). Without this preprocessing the relevant recurrence equations are not accessible, and without the mentioned algorithm the solutions of these recurrence equations are out of reach. Furthermore, we present an algorithm to deduce the inversion coefficients for the basis in terms of the Askey–Wilson polynomials. Our results generalize and extend known results, and they can be used to deduce the connection and linearization coefficients for any family of classical orthogonal polynomial (including very classical orthogonal polynomials and classical orthogonal polynomials on non-uniform lattices), using the fact that from the Askey–Wilson polynomials, one can deduce, by specialization and/or by limiting processes, any other family of classical orthogonal polynomials. As illustration, we give explicitly the connection coefficients of the continuous q-Hahn, q-Racah and Wilson polynomials. [Copyright &y& Elsevier]

Published

2013

48. A q-series expansion formula and the Askey-Wilson polynomials.

Author

Liu, Zhi-Guo

Abstract

Previously, we proved a q-series expansion formula which allows us to recover many important classical results for q-series. Based on this formula, we derive a new q-formula in this paper, which clearly includes infinitely many q-identities. This new formula is used to give a new proof of the orthogonality relation for the Askey-Wilson polynomials. A curious q-transformation formula is proved, and many applications of this transformation to Hecke type series are given. Some Lambert series identities are also derived. [ABSTRACT FROM AUTHOR]

Published

2013

49. FORMULAE FOR ASKEY-WILSON MOMENTS AND ENUMERATION OF STAIRCASE TABLEAUX.

Author

Corteel, S., Stanley, R., Stanton, D., and Williams, L.

Subjects

*MATHEMATICAL formulas, *PERMUTATIONS, *MATHEMATICAL symmetry, *FIBONACCI sequence, *COMBINATORIAL enumeration problems, *POLYNOMIALS

Abstract

We explain how the moments of the (weight function of the) Askey-Wilson polynomials are related to the enumeration of the staircase tableaux introduced by the first and fourth authors. This gives us a direct combinatorial formula for these moments, which is related to, but more elegant than the formula given in their earlier paper. Then we use techniques developed by Ismail and the third author to give explicit formulae for these moments and for the enumeration of staircase tableaux. Finally we study the enumeration of staircase tableaux at various specializations of the parameterizations; for example, we obtain the Catalan numbers, Fibonacci numbers, Eulerian numbers, the number of permutations, and the number of matchings. [ABSTRACT FROM AUTHOR]

Published

2012

50. Connection relations and characterizations of orthogonal polynomials

Author

Ismail, Mourad E.H. and Simeonov, Plamen

Subjects

*ORTHOGONAL polynomials, *MATHEMATICAL symmetry, *NUMERICAL analysis, *OPERATOR theory, *MATHEMATICAL analysis, *FUNCTIONAL analysis

Abstract

Abstract: We give a general method of characterizing symmetric orthogonal polynomials through a certain type of connection relations. This method is applied to Al-Salam–Chihara, Askey–Wilson, and Meixner–Pollaczek polynomials. This characterization technique unifies and extends some previous characterization results of Lasser and Obermaier and Ismail and Obermaier. Along the way we explicitly evaluate the connection coefficients in the expansion of in terms of , where is the Askey–Wilson operator and are general Askey–Wilson polynomials. As a limiting case we derive the corresponding connection coefficients in the expansion of in terms of , where is the Wilson operator and are general Wilson polynomials. Using the connection relation for Askey–Wilson polynomials, we obtain a characterization for the two-parameter symmetric Askey–Wilson polynomials. The connection relations between , and are also derived. [Copyright &y& Elsevier]

Published

2012