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Non-symmetric Jacobi and Wilson type polynomials

经典分析与常微分方程 2016-09-07 v1 泛函分析

摘要

Consider a root system of type BC1BC_1 on the real line R\mathbb R with general positive multiplicities. The Cherednik-Opdam transform defines a unitary operator from an L2L^2-space on R\mathbb R to a L2L^2-space of C2\mathbb C^2-valued functions on R+\mathbb R^+ with the Harish-Chandra measure c(\lam)2d\lam|c(\lam)|^{-2}d\lam. By introducing a weight function of the form cosh\sig(t)tanh2kt\cosh^{-\sig}(t)\tanh^{2k} t on R\mathbb R we find an orthogonal basis for the L2L^2-space on R\mathbb R consisting of even and odd functions expressed in terms of the Jacobi polynomials (for each fixed \sig\sig and kk). We find a Rodrigues type formula for the functions in terms of the Cherednik operator. We compute explicitly their Cherednik-Opdam transforms. We discover thus a new family of C2\mathbb C^2-valued orthogonal polynomials. In the special case when k=0k=0 the even polynomials become Wilson polynomials, and the corresponding result was proved earlier by Koornwinder.

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引用

@article{arxiv.math/0511709,
  title  = {Non-symmetric Jacobi and Wilson type polynomials},
  author = {Lizhong Peng and Genkai Zhang},
  journal= {arXiv preprint arXiv:math/0511709},
  year   = {2016}
}