A CONVOLUTION STRUCTURE FOR JACOBI SERIES.
- Richard Askey
- Stephen Wainger
CiteWeb id: 20160000952
CiteWeb score: 90
Gangolli  discovered this convolution structure for special values of ac and J3 namely /3= 1/2, a = (n -1)/2; 3=0, ac n; and /3=1, a-2n + 1; 1 G= 3, c = 7. n here is a non-negative integer. Let P (a,0) (x) be the Jacobi polynomial of degree n, order (2,/) defined by P(?()are orthogonal onl (-1, 1) writh resplect tO ( 1 0x)at(1 ? x7)~ a ndlLinks to full text of the publication: