Confluent hypergeometric orthogonal polynomials related to the rational quantum Calogero system with harmonic confinement

被引:64
作者
vanDiejen, JF
机构
[1] Ctr. de Rech. Mathématiques, Université de Montréal, Montréal, Que. H3C 3J7, C.P. 6128, succursale Centre-ville
来源
COMMUNICATIONS IN MATHEMATICAL PHYSICS | 1997年 / 188卷 / 02期
关键词
D O I
10.1007/s002200050174
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
Two families (type A and type B) of confluent hypergeometric polynomials in several variables are studied. We describe the orthogonality properties, differential equations, and Pieri-type recurrence formulas for these families. In the one-variable case, the polynomials in question reduce to the Hermite polynomials (type A) and the Laguerre polynomials (type B), respectively. The multivariable confluent hypergeometric families considered here may be used to diagonalize the rational quantum Calogero models with harmonic confinement (for the classical root systems) and are closely connected to the (symmetric) generalized spherical harmonics investigated by Dunkl.
引用
收藏
页码:467 / 497
页数:31
相关论文
共 51 条
[1]  
Abramowitz M., 1970, HDB MATH FUNCTIONS
[2]   A SET OF HYPERGEOMETRIC ORTHOGONAL POLYNOMIALS [J].
ASKEY, R ;
WILSON, J .
SIAM JOURNAL ON MATHEMATICAL ANALYSIS, 1982, 13 (04) :651-655
[3]   SOME BASIC HYPERGEOMETRIC EXTENSIONS OF INTEGRALS OF SELBERG AND ANDREWS [J].
ASKEY, R .
SIAM JOURNAL ON MATHEMATICAL ANALYSIS, 1980, 11 (06) :938-951
[4]  
ASKEY R, 1985, PHYSICS A MATH GEN, V18, pL1017
[5]   THE HAHN AND MEIXNER POLYNOMIALS OF AN IMAGINARY ARGUMENT AND SOME OF THEIR APPLICATIONS [J].
ATAKISHIYEV, NM ;
SUSLOV, SK .
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL, 1985, 18 (10) :1583-1596
[6]  
BAKER TH, 1996, RIMS1094
[7]   CERTAIN HYPERGEOMETRIC-SERIES RELATED TO THE ROOT SYSTEM-BC [J].
BEERENDS, RJ ;
OPDAM, EM .
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 1993, 339 (02) :581-609
[8]   THE CALOGERO MODEL - ANYONIC REPRESENTATION, FERMIONIC EXTENSION AND SUPERSYMMETRY [J].
BRINK, L ;
HANSSON, TH ;
KONSTEIN, S ;
VASILIEV, MA .
NUCLEAR PHYSICS B, 1993, 401 (03) :591-612
[9]   EXPLICIT SOLUTION TO THE N-BODY CALOGERO PROBLEM [J].
BRINK, L ;
HANSSON, TH ;
VASILIEV, MA .
PHYSICS LETTERS B, 1992, 286 (1-2) :109-111
[10]   SOLUTION OF ONE-DIMENSIONAL N-BODY PROBLEMS WITH QUADRATIC AND/OR INVERSELY QUADRATIC PAIR POTENTIALS [J].
CALOGERO, F .
JOURNAL OF MATHEMATICAL PHYSICS, 1971, 12 (03) :419-&
123456