A Note on the 2F1 Hypergeometric Function

Abstract

The special case of the hypergeometric function 2F1 represents the binomial series (1+x)α=Σn=0∞(\:α n\:)xn that always converges when |x|<1. Convergence of the series at the endpoints, x= 1, depends on the values of α and needs to be checked in every concrete case. In this note, using new approach, we reprove the convergence of the hypergeometric series 2F1(α,β;β;x) for |x|<1 and obtain new result on its convergence at point x=-1 for every integer α≠ 0. The proof is within a new theoretical setting based on the new method for reorganizing the integers and on the regular method for summation of divergent series.