Linearization of the Product of Jacobi Polynomials. III

Richard Askey; George Gasper

doi:10.4153/CJM-1971-033-6

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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

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