Convexity properties related to Gauss hypergeometric function

Abstract

We investigate the convexity property on (0,1) of the functions a,b,c and 1/a,b,c, where a,b,c(x)= c-(1-x)\,2F1(a,b,a+b,x), whenever a,b≥ 0 and a+b≤ 1. We Show that a,b,c (respectively 1/a,b,c) is strictly convex on (0,1) if and only if c≤ -2γ-(a)-(b), (respectively c≥α0) and a,b,c (respectively 1/a,b,c) is strictly concave on (0,1) if and only if c≥ c(a,b) (respectively c∈[δ-,δ+]), where is the Polygamma function. This generalizes some problems posed by Yang and Tian and complete the study of convexity properties of functions studied by the author in [bouali]. As applications of the convexity and concavity, we establish among other inequalities, that for all x∈(0,1), a,b∈[0,1], a+b≤ 1 and c≥ c(a,b) c+(a)(b)(a+b)≤ c-(1-x)\,2F1(a,b,a+b,x)+c-(x)\,2F1(a,b,a+b,1-x)≤(2c+2 2)\,2F1(a,b;a+b;1/2), and for all x∈(0,1), a,b∈[0,1], a+b≤ 1 and c∈ [δ-,δ+] 1c+(a+b)(a)(b)≤ \,2F1(a,b,a+b,x)c-(1-x)+\,2F1(a,b,a+b,1-x)c-(x)≤\,2F1(a,b;a+b;1/2)(2c+2 2).