Martingale inequalities of type Dzhaparidze and van Zanten

Abstract

Freedman's inequality is a supermartingale counterpart to Bennett's inequality. This result shows that the tail probabilities of a supermartingale is controlled by the quadratic characteristic and a uniform upper bound for the supermartingale difference sequence. Replacing the quadratic characteristic by Hky:= Σi=1k(E(i2 |Fi-1) +i21\|i|> y\), Dzhaparidze and van Zanten (Stochastic Process. Appl., 2001) have extended Freedman's inequality to martingales with unbounded differences. In this paper, we prove that Hky can be refined to Gky :=Σi=1k ( E(i21\i ≤ y\ |Fi-1) + i21\i> y\). Moreover, we also establish two inequalities of type Dzhaparidze and van Zanten. These results extend Sason's inequality (Statist. Probab. Lett., 2012) to the martingales with possibly unbounded differences and establish the connection between Sason's inequality and De la Pe\~na's inequality (Ann.\ Probab., 1999). An application to self-normalized deviations is given.