On the Azuma inequality in spaces of subgaussian of rank p random variables

Abstract

For p > 1 let a function p(x) = x2/2 if |x| 1 and p(x) = 1/p|x|p -1/p + 1/2 if |x| > 1. For a random variable let τ_p() denote ∈f\c 0 :\; ∀λ∈R\; (λ)p(cλ)\; τ_p is a norm in a space Sub_p() =\: \; τ_p() <∞\ of p-subgaussian random variables which we call subgaussian of rank p random variables. For p = 2 we have the classic subgaussian random variables. The Azuma inequality gives an estimate on the probability of the deviations of a zero-mean martingale (n)n 0 with bounded increments from zero. In its classic form is assumed that 0 = 0. In this paper it is shown a version of the Azuma inequality under assumption that 0 is any subgaussian of rank p random variable.