The asymptotic expansion of a function due to L.L. Karasheva

Abstract

We consider the asymptotic expansion for x∞ of the entire function \[Fn,σ(x;μ)=Σk=0∞ \,(nγk) γk\,xkk! (μ-σ k), γk=(k+1)π2n\] for μ>0, 0<σ<1 and n=1, 2, …\ . When σ=α/(2n), with 0<α<1, this function was recently introduced by L.L. Karasheva [ J. Math. Sciences, 250 (2020) 753--759] as a solution of a fractional-order partial differential equation. By expressing Fn,σ(x;μ) as a finite sum of Wright functions, we employ the standard asymptotics of integral functions of hypergeometric type to determine its asymptotic expansion. This is found to depend critically on the parameter σ (and to a lesser extent on the integer n). Numerical results are presented to illustrate the accuracy of the different expansions obtained.