Linearization of the Product of Jacobi Polynomials. III

Richard Askey; George Gasper

doi:10.4153/CJM-1971-033-6

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

In a series of papers [1; 2; 3; 4] the operation of linearizing the product of two Jacobi polynomials Pn(α, β)(x), α, β > –1, has been investigated and the existence of a natural Banach algebra associated with the linearization coefficients has been proven. This was proven for α + β + 1 ≧ 0 in [3] and for a slightly larger region in [4]. It was shown in [4] that such a Banach algebra does not exist for . The method used in [1; 3; 4] was to prove the non-negativity of the expansion coefficients from which the existence of the Banach algebra easily follows. However, as shown in [4], the coefficients for a subset of can be negative infinitely often and so a different method must be used for these values of α and β.

References

1. Askey, R., Linearization of the product of orthogonal polynomials, pp. 223-228 in Problems in analysis (Princeton Univ. Press, Princeton, N.J., 1970).Google Scholar

2. Askey, R. and Wainger, S., A dual convolution structure for Jacobi polynomials, pp. 25–36 in Orthogonal expansions and their continuous analogues, Proc. Conference, Edwardsville, Illinois, 1967 (Southern Illinois Univ. Press, Carbondale, Illinois, 1968).Google Scholar

3. Gasper, G., Linearization of the product of Jacobi polynomials. I, Can. J. Math. 22 (1970), 171–175.Google Scholar

4. Gasper, G., Linearization of the product of Jacobi polynomials. II, Can. J. Math. 22 (1970), 582–593.Google Scholar

5. Gasper, G., Positivity and the convolution structure for Jacobi series, Ann. of Math, (to appear).Google Scholar

6. Igari, S. and Uno, Y., Banach algebra related to the Jacobi polynomials, Töhoku Math. J. 21 (1969), 668–673.Google Scholar

7. Szegö, G., Orthogonal polynomials, Amer. Math. Soc. Colloq. Publ., Vol. 23 (Amer. Math. Soc, Providence, R.I., 1967).Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Gasper, George 1975. Theory and Application of Special Functions. p. 375.

Askey, R. and Bingham, N. H. 1976. Gaussian processes on compact symmetric spaces. Zeitschrift f�r Wahrscheinlichkeitstheorie und Verwandte Gebiete, Vol. 37, Issue. 2, p. 127.

Rahman, M. 1976. Construction of a Family of Positive Kernels from Jacobi Polynomials. SIAM Journal on Mathematical Analysis, Vol. 7, Issue. 1, p. 92.

Askey, Richard and Gasper, George 1977. Convolution structures for Laguerre polynomials. Journal d'Analyse Mathématique, Vol. 31, Issue. 1, p. 48.

Schwartz, Alan L. 1977. l 1-Convolution algebras: Representation and factorization. Zeitschrift f�r Wahrscheinlichkeitstheorie und Verwandte Gebiete, Vol. 41, Issue. 2, p. 161.

Rahman, Mizan and Shah, Mihr J. 1985. An Infinite Series with Products of Jacobi Polynomials and Jacobi Functions of the Second Kind. SIAM Journal on Mathematical Analysis, Vol. 16, Issue. 4, p. 859.

Berezanskii, Yu. M. and Kalyuzhnyi, A. A. 1987. Hypercomplex systems originating from orthogonal polynomials. Ukrainian Mathematical Journal, Vol. 38, Issue. 3, p. 237.

Vainerman, L. I. 1988. Duality of algebras with an involution and generalized shift operators. Journal of Soviet Mathematics, Vol. 42, Issue. 6, p. 2113.

Szwarc, Ryszard 1992. Orthogonal Polynomials and a Discrete Boundary Value Problem II. SIAM Journal on Mathematical Analysis, Vol. 23, Issue. 4, p. 965.

Szwarc, Ryszard 1992. Orthogonal Polynomials and a Discrete Boundary Value Problem I. SIAM Journal on Mathematical Analysis, Vol. 23, Issue. 4, p. 959.

Lubinsky, Doron S. and Totik, Vilmos 1994. Best Weighted Polynomial Approximation via Jacobi Expansions. SIAM Journal on Mathematical Analysis, Vol. 25, Issue. 2, p. 555.

1995. Harmonic Analysis of Probability Measures on Hypergroups. p. 553.

Álvarez-Nodarse, R. Quintero, N.R. and Ronveaux, A. 1999. On the linearization problem involving Pochhammer symbols and their q-analogues. Journal of Computational and Applied Mathematics, Vol. 107, Issue. 1, p. 133.

Ben Cheikh, Y. and Chaggara, H. 2006. Linearization coefficients for Sheffer polynomialsets via lowering operators. International Journal of Mathematics and Mathematical Sciences, Vol. 2006, Issue. 1,

Lasser, Rupert Obermaier, Josef and Rauhut, Holger 2007. Generalized hypergroups and orthogonal polynomials. Journal of the Australian Mathematical Society, Vol. 82, Issue. 3, p. 369.

Sánchez-Moreno, P. Dehesa, J.S. Zarzo, A. and Guerrero, A. 2013. Rényi entropies, Lq norms and linearization of powers of hypergeometric orthogonal polynomials by means of multivariate special functions. Applied Mathematics and Computation, Vol. 223, Issue. , p. 25.

Abd-Elhameed, Waleed M 2015. New formulas for the linearization coefficients of some nonsymmetric Jacobi polynomials. Advances in Difference Equations, Vol. 2015, Issue. 1,

Abd-Elhameed, W.M. 2015. New product and linearization formulae of Jacobi polynomials of certain parameters. Integral Transforms and Special Functions, Vol. 26, Issue. 8, p. 586.

Doha, E.H. and Abd-Elhameed, W.M. 2016. New linearization formulae for the products of Chebyshev polynomials of third and fourth kinds. Rocky Mountain Journal of Mathematics, Vol. 46, Issue. 2,

Abd-Elhameed, W. M. Doha, E. H. and Ahmed, H. M. 2016. Linearization formulae for certain Jacobi polynomials. The Ramanujan Journal, Vol. 39, Issue. 1, p. 155.

Download full list

Article contents

Linearization of the Product of Jacobi Polynomials. III

Extract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests