Recurrence relations and applications for the Maclaurin coefficients of squared and cubic hypergeometric functions

Abstract

In this paper, we present and prove that the coefficients un and vn in the series expansions F2(a,b;c;z) = Σn=0∞ un zn and F3(a,b;c;z) = Σn=0∞ vn zn (a,b,c,z ∈ C and -c N \0\) satisfy second- and third-order linear recurrence relations, respectively, where F(a,b;c;x) denotes the Gaussian hypergeometric function and C is the complex plane. Our results provide recurrence relations for the Maclaurin coefficients of the squares and cubes of several classical special functions in the complex domain, including zero-balanced Gauss hypergeometric functions, elliptic integrals, as well as classical orthogonal polynomials such as Chebyshev, Legendre, Gegenbauer, and Jacobi polynomials. As applications, we first establish the monotonicity of a function involving Gauss hypergeometric functions and then present a new proof of the well-known Clausen's formula.