A Handbook of Generalized Special Functions for Statistical and Physical Sciences

Part 1 Mathematical preliminaries: the gamma function; Bernoulli polynomials; asymptotic expansions of gamma functions; the psi functions; the generalized zeta functions; the beta function; calculation of residues for gamma functions; the Mellin transform; density functions; methods of deriving distributions; exercises. Part 2 The G-function: some basic properties of the G-function; the Mellin transform of a G-function; properties connected with the derivatives of a G-function; series representation for a G-function; G-function as multiple integrals or as solutions of integral equations; differential equation for a G-function; asymptotic expansions for a G-function; exercises. Part 3 Elementary special functions and the G-function: gamma and related functions - notations and definitions; hypergeometric functions - notations and special cases; confluent hypergeometric function and related function; exponential integral and related function; Bessel functions and associated functions; other special functions; orthogonal polynomials; elementary special functions expressed in terms of elementary special functions; some integrals involving G-functions; the H-function; computational aspects of G- and H-functions; orders of the special functions for small and large values of the argument; exercises. Part 4 Generalizations to matrix variables: scalar functions of a symmetric positive definite matrix; scalar functions of matrix arguments; Laplace transform; hypergeometric functions of matrix arguments; generalized matrix transform of M-transform; zonal polynomial; matrix variate Dirichlet distribution; hypergeometric functions of many scalar variables; hypergeometric functions of many matrix arguments; G- and H-functions of two variables; exercises.