On an identity by Ercolani, Lega, and Tippings
Maxim L. Yattselev
Abstract
In this note we prove that \[ j!\,2^N \, \binom{N+j-1}{j} \, {}_2F_1\left(\begin{matrix}-j,-2j \\ -N-j+1 \end{matrix};-1\right) = \sum_{l=0}^N \binom{N}{l}\prod_{i=0}^{j-1}2(2i+1+l), \] where $ N $ and $ j $ are positive integers, which resolves a question posed by Ercolani, Lega, and Tippings.