A Tight Bound of Tail Probabilities for a Discrete-time Martingale with Uniformly Bounded Jumps

Abstract

We investigate the properties of a discrete-time martingale \Xm\m∈ Z≥ 0, where all differences between adjacent random variables are limited to be not more than a constant as a promise. In this situation, it is known that the Azuma-Hoeffding inequality holds, which gives an upper bound of a probability for exceptional events. The inequality gives a simple form of the upper bound, and it has been utilized for many investigations. However, the inequality is not tight. We give an explicit expression of a tight upper bound, and we show that it and the bound obtained from the Azuma-Hoeffding inequality have different asymptotic behaviors.