Integral representations and summations of modified Struve function

Abstract

It is known that Struve function H and modified Struve function L are closely connected to Bessel function of the first kind J and to modified Bessel function of the first kind I and possess representations through higher transcendental functions like generalized hypergeometric 1F2 and Meijer G function. Also, the NIST project and Wolfram formula collection contain a set of Kapteyn type series expansions for L(x). In this paper firstly, we obtain various another type integral representation formulae for L(x) using the technique developed by D. Jankov and the authors. Secondly, we present some summation results for different kind of Neumann, Kapteyn and Schl\"omilch series built by I(x) and L(x) which are connected by a Sonin--Gubler formula, and by the associated modified Struve differential equation. Finally, solving a Fredholm type convolutional integral equation of the first kind, Bromwich--Wagner line integral expressions are derived for the Bessel function of the first kind J and for an associated generalized Schl\"omilch series.