Evaluation of some non-elementary integrals involving the generalized hypergeometric function with some applications

Abstract

The indefinite integral ∫ xα eη xβ\,pFq (a1, a2, ··· ap; b1, b2, ···, bq; λ xγ)dx, where α, η, β, λ, γ0 are real or complex constants and pFq is the generalized hypergeometric function, is evaluated in terms of an infinite series involving the generalized hypergeometric function. Related integrals in which the exponential function eη xβ is either replaced by the hyperbolic function (η xβ) or (η xβ), or the sinusoidal function (η xβ) or (η xβ), are also evaluated in terms of infinite series involving the generalized hypergeometric function pFq. Some application examples from applied analysis, in which some new Fourier and Laplace integrals (or transforms) are evaluated, are given. The analytical solution of the Orr-Sommerfeld equation (with a linear mean flow background) in the short-wave limit is expressed in terms of some infinite series involving the hypergeometric series 2F3. Making use of the hyperbolic and Euler identities, some interesting series identities involving exponential, hyperbolic, trigonometric functions and the generalized hypergeometric function are also derived.