Convexity and concavity of a class of functions related to the elliptic functions

Abstract

We investigate the convexity property on (0,1) of the function fa(x)= K( x)a-(1/2)(1-x). We show that fa is strictly convex on (0,1) if and only if a≥ ac and 1/fa is strictly convex on (0,1) if and only if a≤ 4, where ac is some critical value. The second main result of the paper is to study the log-convexity and log-concavity of the function hp(x)=(1-x)p K( x). We prove that hp is strictly log-concave on (0,1) if and only if p≥ 7/32 and strictly log-convex if and only if p≤ 0. This solves some problems posed by Yang and Tian and complete their result and a result of Alzer and Richards that fa is strictly concave on (0,1) if and only if a=4/3 and 1/fa is strictly concave on (0,1) if and only if a≥ 8/5. As applications of the convexity and concavity, we establish among other inequalities, that for a≥ ac and all r∈(0,1) 2ππ(2a+ 2)(3/4)2≤ K( r)a-12 (r)+ K(1-r)a-12 (1-r)<1+π2a, and for p≥ 3(2+ 2)/8 and all r∈(0,1) (r-r2)p K(1-r) K( r)< ππ2p+1(3/4)2<rp K(1-r)+(1-r)p K( r)2.

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