The asymptotic expansion of Kratzel's integral and an integral related to an extension of the Whittaker function

Abstract

We consider the asymptotic expansion of Kr\"atzel's integral \[Fp,(x)=∫0∞ t-1 e-tp-x/t\,dt (|\,x|<π/2),\] for p>0 as |x| ∞ in the sector |\,x|<π/2 employing the method of steepest descents. An alternative derivation of this expansion is given using a Mellin-Barnes integral approach. The cases p<0, ()<0 and when x and (p>0) are both large are also considered. A second section discusses the asymptotic expansion of an integral involving a modified Bessel function that has recently been introduced as an extension of the Whittaker function M,μ(z). Numerical examples are provided to illustrate the accuracy of the various expansions obtained.

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