Complete asymptotic expansions of the Humbert function $Ψ_1$ for two large arguments

Abstract: In our recent work [SIGMA \textbf{20} (2024), 074, 13 pages], the leading behaviour of the Humbert function $\Psi_1[a,b;c,c';x,y]$ when $x\to\infty$ and $y\to +\infty$ has been derived in a direct and simple manner. In this paper, we obtain the complete asymptotics of $\Psi_1$ in the general case $x,y\to\infty$ along a new path. Indeed, our proof is based on a sharp estimate on ${}2F_2[a,b-n;c,d-n;z]$, which is valid uniformly for $n\in\mathbb{Z}{\geqslant 0}$ and large $z$.