Heckman–Opdam polynomials
From Wikipedia, the free encyclopedia
In mathematics, Heckman–Opdam polynomials (sometimes called Jacobi polynomials) Pλ(k) are orthogonal polynomials in several variables associated to root systems. They were introduced by Heckman and Opdam (1987).
They generalize Jack polynomials when the roots system is of type A, and are limits of Macdonald polynomials Pλ(q, t) as q tends to 1 and (1 − t)/(1 − q) tends to k. Main properties of the Heckman–Opdam polynomials have been detailed by Siddhartha Sahi [1]
References
- ↑ A new formula for weight multiplicities and characters, Theorem 1.3. about Heckman–Opdam polynomials, Siddhartha Sahi arXiv:math/9802127
- Heckman, G. J.; Opdam, E. M. (1987), "Root systems and hypergeometric functions. I", Compositio Mathematica 64 (3): 329–352, MR 0918416
- Heckman, G. J.; Opdam, E. M. (1987b), "Root systems and hypergeometric functions. II", Compositio Mathematica 64 (3): 353–373, MR 0918417
- Opdam, E. M. (1988), "Root systems and hypergeometric functions. III", Compositio Mathematica 67 (1): 21–49, MR 0949270
- Opdam, E. M. (1988b), "Root systems and hypergeometric functions. IV", Compositio Mathematica 67 (2): 191–209., MR 0951750
This article is issued from Wikipedia. The text is available under the Creative Commons Attribution/Share Alike; additional terms may apply for the media files.