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A way to treat dual Hahn polynomials as Racah polynomials via the theory of Leonard pairs

Published 4 Aug 2025 in math.CA and math.CO | (2508.02032v1)

Abstract: The dual Hahn polynomials ${u_i(x)}{i=0}d$ are a family of discrete orthogonal polynomials involving two real parameters $r$ and $s$. Let $L,L*$ denote the corresponding Leonard pair. Assume that $r\not=0$ and $r+s=0$. We show that $L,(L*+\frac{r-d}{2}){2}$ is a Leonard pair. According to the theory of Leonard pairs, the polynomials ${u_i(x)}{i=0}d$ are not only the dual Hahn polynomials but also the Racah polynomials with respect to the same inner product.

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