A general "bang-bang" principle for predicting the maximum of a random walk

Abstract

Let (Bt)0≤ t≤ T be either a Bernoulli random walk or a Brownian motion with drift, and let Mt:=\Bs: 0≤ s≤ t\, 0≤ t≤ T. This paper solves the general optimal prediction problem 0≤τ≤ T[f(MT-Bτ)], where the supremum is over all stopping times τ adapted to the natural filtration of (Bt), and f is a nonincreasing convex function. The optimal stopping time τ* is shown to be of "bang-bang" type: τ* 0 if the drift of the underlying process (Bt) is negative, and τ* T is the drift is positive. This result generalizes recent findings by S. Yam, S. Yung and W. Zhou [ J. Appl. Probab. 46 (2009), 651--668] and J. Du Toit and G. Peskir [ Ann. Appl. Probab. 19 (2009), 983--1014], and provides additional mathematical justification for the dictum in finance that one should sell bad stocks immediately, but keep good ones as long as possible.