A Weak Law of Large Numbers for Dependent Random Variables
Abstract
Every sequence f1, f2, ·s \, of random variables with \, M ∞ ( M k ∈ N P ( |fk| > M ) )=0\, contains a subsequence fk1, fk2 , ·s \, that satisfies, along with all its subsequences, the weak law of large numbers: \, N ∞ ( (1/N) Σn=1N fkn - DN ) =0\,, in probability. Here \, DN\, is a "corrector" random variable with values in [-N,N], for each N ∈ N ; these correctors are all equal to zero if, in addition, \, k ∞ E ( fk2 \, 1 \ |fk| M \ ) =0\, holds for every M ∈ (0, ∞)\,.
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