中文

The Bivariate Rogers-Szeg\"{o} Polynomials

组合数学 2015-06-26 v2

摘要

We present an operator approach to deriving Mehler's formula and the Rogers formula for the bivariate Rogers-Szeg\"{o} polynomials hn(x,yq)h_n(x,y|q). The proof of Mehler's formula can be considered as a new approach to the nonsymmetric Poisson kernel formula for the continuous big qq-Hermite polynomials Hn(x;aq)H_n(x;a|q) due to Askey, Rahman and Suslov. Mehler's formula for hn(x,yq)h_n(x,y|q) involves a 3ϕ2{}_3\phi_2 sum and the Rogers formula involves a 2ϕ1{}_2\phi_1 sum. The proofs of these results are based on parameter augmentation with respect to the qq-exponential operator and the homogeneous qq-shift operator in two variables. By extending recent results on the Rogers-Szeg\"{o} polynomials hn(xq)h_n(x|q) due to Hou, Lascoux and Mu, we obtain another Rogers-type formula for hn(x,yq)h_n(x,y|q). Finally, we give a change of base formula for Hn(x;aq)H_n(x;a|q) which can be used to evaluate some integrals by using the Askey-Wilson integral.

关键词

引用

@article{arxiv.math/0612430,
  title  = {The Bivariate Rogers-Szeg\"{o} Polynomials},
  author = {William Y. C. Chen and Husam L. Saad and Lisa H. Sun},
  journal= {arXiv preprint arXiv:math/0612430},
  year   = {2015}
}

备注

16 pages, revised version, to appear in J. Phys. A: Math. Theor