Bounds for tail probabilities of martingales using skewness and kurtosis

Abstract

Let Mn= X1n be a sum of independent random variables such that Xk≤ 1, Xk =0 and Xk2=k2 for all k. Hoeffding 1963, Theorem 3, proved that Mn ≥ nt≤ Hn(t,p), H(t,p)= (1+qt/p)p +qt (1-t)q -qt with q= 11+2, p=1-q, 2 = 12+...+n2n, 0<t<1. Bentkus 2004 improved Hoeffding's inequalities using binomial tails as upper bounds. Let k = Xk3/k3 and k= Xk4/k4 stand for the skewness and kurtosis of Xk. In this paper we prove (improved) counterparts of the Hoeffding inequality replacing 2 by certain functions of 1n respectively 1n. Our bounds extend to a general setting where Xk are martingale differences, and they can combine the knowledge of skewness and/or kurtosis and/or variances of ~Xk. Up to factors bounded by e2/2 the bounds are final. All our results are new since no inequalities incorporating skewness or kurtosis control so far are known.