Recurrence relations for the coefficients of the confluent and Gauss hypergeometric functions in the complex plane

Abstract

For a,b,c,z,p, θ ∈ C, where C is the complex plane, -c N \ 0\ , let equation* M( z) =( 1-θ z) pM(a;c;z) =Σn=0∞ unzn, equation* where |z| <1θ, | (1-θ z)| < π, and let equation* G( z) =(1-θ z) pF(a,b;c;z) =Σn=0∞ vn zn, equation* where |z| < 1, | (1-θ z)| < π. In this paper, we prove that the coefficients un and vn for n≥ 0 satisfy a 3-order recurrence relation. These offer a new way to study confluent hypergeometric function M(a;c;z) and Gauss hypergeometric function F(a,b;c;z). And we provide other special functions' recurrence relations of their coefficients, such as error function, Bessel function, incomplete gamma function, complete elliptic integral and Chebyshev polynomials.