ON COMPOSITION OF SOME GENERAL FRACTIONAL INTEGRAL-OPERATORS

In the present paper we derive three interesting expressions for the composition of two most general fractional integral operators whose kernels involve the product of a general class of polynomials and a multivariable H-function. By suitably specializing the coefficients and the parameters in these functions we can get a large number of (new and known) interesting expressions for the composition of fractional integral operators involving classical orthogonal polynomials and simpler special functions (involving one or more variables) which occur rather frequently in problems of mathematical physics. We have mentioned here two special cases of the first composition formula. The first involves product of a general class of polynomials and the Fox's H-functions and is of interest in itself. The findings of Buschman [1] and Erdelyi [4] follow as simple special cases of this composition formula. The second special case involves product of the Jacobi polynomials, the Hermite polynomials and the product of two multivariable H-functions. The present study unifies and extends a large number of results lying scattered in the literature. Its findings are general and deep.