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http://dx.doi.org/10.7858/eamj.2015.010

SOME RECURRENCE RELATIONS FOR THE JACOBI POLYNOMIALS P(α,β)n(x)  

Choi, Junesang (Department of Mathematics, Dongguk University)
Shine, Raj S.N. (Department of Mathematics, Central University of Kerala)
Rathie, Arjun K. (Department of Mathematics, Central University of Kerala)
Publication Information
East Asian mathematical journal / v.31, no.1, 2015 , pp. 103-107 More about this Journal
Abstract
We use some known contiguous function relations for $_2F_1$ to show how simply the following three recurrence relations for Jacobi polynomials $P_n^{({\alpha},{\beta)}(x)$: (i) $({\alpha}+{\beta}+n)P_n^{({\alpha},{\beta})}(x)=({\beta}+n)P_n^{({\alpha},{\beta}-1)}(x)+({\alpha}+n)P_n^{({\alpha}-1,{\beta})}(x);$ (ii) $2P_n^{({\alpha},{\beta})}(x)=(1+x)P_n^{({\alpha},{\beta}+1)}(x)+(1-x)P_n^{({\alpha}+1,{\beta})}(x);$ (iii) $P_{n-1}^{({\alpha},{\beta})}(x)=P_n^{({\alpha},{\beta}-1)}(x)+P_n^{({\alpha}-1,{\beta})}(x)$ can be established.
Keywords
Contiguous function relations; Gauss hypergeometric series $_2F_1$; Jacobi polynomials $P_n^{({\alpha},{\beta})}(x)$); Pfaff-Kummer transformation for $_2F_1$;
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  • Reference
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