On Cox-Kemperman moment inequalities for independent centered random variables

Abstract

In 1983 Cox and Kemperman proved that f()+ f(η) f(+η) for all functions f, such that f(0)=0 and the second derivative f''(y) is convex, and all independent centered random variables and η satisfying certain moment restrictions. We show that the minimal moment restrictions are sufficient for the inequality to be valid, and write out a less restrictive condition on f for the inequality to hold. Besides, Cox and Kemperman (1983) found out the optimal constants A and B for the inequalities A ( || + |η|) | + η| B ( || + |η|) , where 1, and η are independent centered random variables. We write out similar sharp inequalities for symmetric random variables.