Tomaszewski's Problem on Randomly Signed Sums: Breaking the 3/8 Barrier
Abstract
Let v1, v2, ..., vn be real numbers whose squares add up to 1. Consider the 2n signed sums of the form S = Σ vi. Holzman and Kleitman (1992) proved that at least 3/8 of these sums satisfy |S| 1. This 3/8 bound seems to be the best their method can achieve. Using a different method, we improve the bound to 13/32, thus breaking the 3/8 barrier.
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