English

Deformed Homogeneous Polynomials and the Generalized $q$-Exponential Operator

Combinatorics 2026-03-11 v6

Abstract

In this paper, we introduce the deformed homogeneous polynomials Rn(x,y;uq)\mathrm{R}_{n}(x,y;u|q). These polynomials generalize some classical polynomials: the Rogers-Szeg\"o polynomials hn(xq)\mathrm{h}_{n}(x|q), the generalized Rogers-Szeg\"o polynomials rn(x,y)\mathrm{r}_{n}(x,y), the Stieltjes-Wigert polynomials Sn(x;q)\mathrm{S}_{n}(x;q), among others. Basic properties of the polynomial Rn\mathrm{R}_{n} are given, along with recurrence relations, its qq-difference equation, and representations. Generating functions for the polynomials Rn(x,y;uq)\mathrm{R}_{n}(x,y;u|q) are given. These functions include generalizations of the Mehler and Rogers formulas. In addition, generalizations of the qq-binomial formula and the Heine transformation formula are obtained. These results are obtained via the uu-deformed qq-exponential operator E(yDqu)\mathrm{E}(yD_{q}|u), defined here. From this operator, we obtain for free the operators T(yDq)(yD_{q}) the Chen, R(yDq)\mathrm{R}(yD_{q}) of Saad, E(yDq)\mathcal{E}(yD_{q}) of Exton, and R(yDq)\mathcal{R}(yD_{q}) of Rogers-Ramanujan when u=1,q,q,q2u=1,q,\sqrt{q},q^2, respectively. We introduce the deformed basic hypergeometric series rΦs{}_{r}\Phi_{s}, a generalization of the classical basic hypergeometric series. New transformation formulas for basic hypergeometric series are obtained.

Keywords

Cite

@article{arxiv.2409.06878,
  title  = {Deformed Homogeneous Polynomials and the Generalized $q$-Exponential Operator},
  author = {Ronald Orozco López},
  journal= {arXiv preprint arXiv:2409.06878},
  year   = {2026}
}
R2 v1 2026-06-28T18:40:31.459Z