Asymptotics of some integrals involving modified Bessel and hyper-Bessel functions

Abstract

We investigate the asymptotic expansion of integrals analogous to Ball's integral \[∫0∞ ((1+)|J(x)|(x/2))\!ndx\] for large n in which the Bessel function J(x) is replaced by the modified Bessel functions I(x) and K(x) together with appropriate exponential factors e x, respectively. The above integral with J(x) replaced by a hyper-Bessel function of the type recently discussed in Aktas et al. [The Ramanujan J., 2019] and taken over a finite interval determined by the first positive zero of the function is also considered for n∞. We give the leading asymptotic behaviour of the hyper-Bessel function for x+∞ in an appendix. Numerical examples are given to illustrate the accuracy of the various expansions obtained.