Tight lower bounds for anti-concentration of Rademacher sums and Tomaszewski's counterpart problem

Abstract

In this paper we prove that P(|X| ≥ Var(X)) ≥ 7/32 for every finite Rademacher sum X, confirming a conjecture by Hitczenko and Kwapie\'n from 1994, and improving upon results from Burkholder, Oleszkiewicz, and Dvor\'ak and Klein. Moreover we fully determine the function f(y)= ∈fX P(|X| ≥ yVar(X)) where the ∈f is taken over all finite Rademacher sums X, confirming a conjecture by Lowther and giving a partial answer to a question by Keller and Klein.