Random walks maximizing the probability to visit an interval

Abstract

We consider random walks, say Wn=(M0, M1,…, Mn), of length n starting at 0 and based on the martingale sequence Mk with differences Xm=Mm-Mm-1. Assuming that the differences are bounded, |Xm|≤ 1, we solve the problem equation Dn(x)\= P \Wn \ visits an interval\ [x,∞)\, x∈ R, piirma equation where is taken over all possible Wn. In particular, we describe random walks which maximize the probability in piirma. We also extend the result to super-martingales.