Probability Mass of Rademacher Sums Beyond One Standard Deviation
Abstract
Let a1, …, an ∈ R satisfy Σi ai2 = 1, and let 1, …, n be uniformly random 1 signs and X = Σi=1n ai i. It is conjectured that X = Σi=1n ai i has [X ≥ 1] ≥ 7/64. The best lower bound so far is 1/20, due to Oleszkiewicz. In this paper we improve this to [X ≥ 1] ≥ 6/64.
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