Persistence of iterated partial sums

Abstract

Let Sn(2) denote the iterated partial sums. That is, Sn(2)=S1+S2+ ... +Sn, where Si=X1+X2+ ... s+Xi. Assuming X1, X2,....,Xn are integrable, zero-mean, i.i.d. random variables, we show that the persistence probabilities pn(2):=(1 i nSi(2)< 0) c|Sn+1|(n+1)|X1|, with c 6 30 (and c=2 whenever X1 is symmetric). The converse inequality holds whenever the non-zero (-X1,0) is bounded or when it has only finite third moment and in addition X1 is squared integrable. Furthermore, pn(2) n-1/4 for any non-degenerate squared integrable, i.i.d., zero-mean Xi. In contrast, we show that for any 0 < γ < 1/4 there exist integrable, zero-mean random variables for which the rate of decay of pn(2) is n-γ.