Law of the iterated logarithm for stationary processes

Abstract

There has been recent interest in the conditional central limit question for (strictly) stationary, ergodic processes ...,X-1,X0,X1,... whose partial sums Sn=X1+...+Xn are of the form Sn=Mn+Rn, where Mn is a square integrable martingale with stationary increments and Rn is a remainder term for which E(Rn2)=o(n). Here we explore the law of the iterated logarithm (LIL) for the same class of processes. Letting · denote the norm in L2(P), a sufficient condition for the partial sums of a stationary process to have the form Sn=Mn+Rn is that n-3/2 E(Sn|X0,X-1,...) be summable. A sufficient condition for the LIL is only slightly stronger, requiring n-3/23/2(n) E(Sn|X0,X-1,...) to be summable. As a by-product of our main result, we obtain an improved statement of the conditional central limit theorem. Invariance principles are obtained as well.

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