Integral representations for certain hypergeometric functions of three variables due to Lauricella and Srivastava (Q798483)

By means of a judicious use of the formula \[ \Gamma (\lambda +\mu +1)/\Gamma (\lambda +1)\Gamma (\mu +1)=2^{\lambda +\mu}\pi^{- 1}\int^{\pi /2}_{-\pi /2}\exp i(\lambda -\mu)\theta Cos^{\lambda +\mu}d\theta \] [\textit{E. T. Whittaker} and \textit{G. N. Watson}, A course of modern analysis, p. 253 (1962; Zbl 0105.269)] certain completely new integral representations of the triple hypergeometric functions \(F_ E\), \(F_ F\), \(F_ G\), \(F_ K\), \(F_ M\), \(H_ A\) and \(H_ B\). These formulae are rather too lengthy for inclusion in a brief review. The integral representation of the function \(F_ E\) is established in some detail and the remaining results are stated without proof since they may easily be deduced using similar methods.