A sharp bound for winning within a proportion of the maximum of a sequence

Abstract

This note considers a variation of the full-information secretary problem where the random variables to be observed are independent and identically distributed. Consider X1,…,Xn to be an independent sequence of random variables, let Mn:=\X1,…,Xn\, and the objective is to select the maximum of the sequence. What is the maximum probability of "stopping at the maximum"? That is, what is the stopping time τ adapted to X1,...,Xn that maximizes P(Xτ=Mn)? This problem was examined by Gilbert and Mosteller GilMost when in addition the common distribution is continuous. The optimal win probability in this case is denoted by vn,max*. What if it is desired to "stop within a proportion of the maximum"? That is, for 0<α<1, what is the stopping rule τ that maximizes P(Xτ ≥ α Mn)? In this note both problems are treated as games, it is proven that for any continuous random variable X, if τ* is the optimal stopping rule then P(Xτ* ≥ α Mn)≥ vn,max*, and this lower bound is sharp. Some examples and another interesting result are presented.