The evaluation of a weighted sum of Gauss hypergeometric functions and its connection with Galton-Watson processes

Abstract

We evaluate the sum of Gauss hypergeometric functions \[S(μ,c;x)=Σk≥ 0 (1-x1+μ)k\,2F1( k+, k+1;c;x)\] for x∈ [-1,1] and positive parameters μ and c. The domain of absolute convergence of this series is established by determining the growth of the hypergeometric function for k+∞. An application to Galton-Watson branching processes arising in the theory of stochastic processes is presented. A new class of positive integer-valued distributions with power tails is introduced.