Tomaszewski's problem on randomly signed sums, revisited

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. Boppana and Holzman (2017) proved that at least 13/32 of these sums satisfy |S| 1. Here we improve their bound to 0.427685.