INEQUALITIES FOR JACOBI POLYNOMIALS

INEQUALITIES FOR JACOBI POLYNOMIALS
INEQUALITIES FOR JACOBI POLYNOMIALS

ㆍ 저자명: Pyung. In Soo,Kim. Hae Gyu
ㆍ 간행물명: Kangweon-Kyungki mathematical journal
ㆍ 권/호정보: 2004년|12권 1호|pp.67-75 (9 pages)
ㆍ 발행정보: 강원경기수학회
ㆍ 파일정보: 정기간행물|ENG|
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ㆍ 주제분야: 기타

이 논문은 한국과학기술정보연구원과 논문 연계를 통해 무료로 제공되는 원문입니다.

서지반출

기타언어초록

Paul Turan observed that the Legendre polynomials satisfy the inequality $P_n(x)^2-P_{n-1}(x)P_{n+1}(x)$ > 0, $-1{leq}x{leq}1$. And G. Gasper(ref. [6], ref. [7]) proved such an inequality for Jacobi polynomials and J. Bustoz and N. Savage (ref. [2]) proved $P^{alpha}_n(x)P^{eta}_{n+1}(x)-P^{alpha}_{n+1}(x)P{eta}_n(x)$ > 0, $frac{1}{2}{leq}{alpha}$ < ${eta}{leq}{alpha}+2.0$ < $x$ < 1, for the ultraspherical polynomials (respectively, Laguerre ploynomials). The Bustoz-Savage inequalities hold for Laguerre and ultraspherical polynomials which are symmetric. In this paper, we prove some similar inequalities for non-symmetric Jacobi polynomials.

키워드

Jacobi polynomial orthogonal polynomial

다운URL