Fractional differentiation of the product of Bessel functions of the first kind (Q2634071)

Several authors like the reviewer and \textit{R. K. Saxena} [Math. Z. 108, 231--234 (1969; Zbl 0169.14503)], \textit{M. Saigo} [Math. Rep. College General Educ., Kyushu Univ. 11, 135--143 (1978; Zbl 0399.45022)] and others [\textit{V. Kiryakova}, Generalized fractional calculus and applications. Harlow: Longman Scientific \& Technical, New York: John Wiley \& Sons (1994; Zbl 0882.26003)] have defined and studied operators of fractional integration involving Gauss hypergeometric functions. This paper deals with inverse fractional operators involving Gauss hypergeometric functions. Composition formulas involving products of Bessel functions of first kind are obtained. The results are given in terms of a generalized Lauricellas function of several variables. Some special cases are mentioned. Statistical interpretations of fractional order integrals and derivatives are considered.