Wald for non-stopping times: The rewards of impatient prophets

Abstract

Let X1,X2,… be independent identically distributed nonnegative random variables. Wald's identity states that the random sum ST:=X1+·s+XT has expectation E(T)) E(X1) provided T is a stopping time. We prove here that for any 1<α≤ 2, if T is an arbitrary nonnegative random variable, then ST has finite expectation provided that X1 has finite α-moment and T has finite 1/(α-1)-moment. We also prove a variant in which T is assumed to have a finite exponential moment. These moment conditions are sharp in the sense that for any i.i.d.\ sequence Xi violating them, there is a T satisfying the given condition for which ST (and, in fact, XT) has infinite expectation. An interpretation of this is given in terms of a prophet being more rewarded than a gambler when a certain impatience restriction is imposed.