Dunkl shift operators and Bannai-Ito polynomials
Abstract
We consider the most general Dunkl shift operator with the following properties: (i) is of first order in the shift operator and involves reflections; (ii) preserves the space of polynomials of a given degree; (iii) is potentially self-adjoint. We show that under these conditions, the operator has eigenfunctions which coincide with the Bannai-Ito polynomials. We construct a polynomial basis which is lower-triangular and two-diagonal with respect to the action of the operator . This allows to express the BI polynomials explicitly. We also present an anti-commutator AW(3) algebra corresponding to this operator. From the representations of this algebra, we derive the structure and recurrence relations of the BI polynomials. We introduce new orthogonal polynomials - referred to as the complementary BI polynomials - as an alternative limit of the Askey-Wilson polynomials. These complementary BI polynomials lead to a new explicit expression for the BI polynomials in terms of the ordinary Wilson polynomials.
Cite
@article{arxiv.1106.3512,
title = {Dunkl shift operators and Bannai-Ito polynomials},
author = {Satoshi Tsujimoto and Luc Vinet and Alexei Zhedanov},
journal= {arXiv preprint arXiv:1106.3512},
year = {2012}
}
Comments
35 pages, to be published in Adv.Math