Lower bounds for the constants in the Bohnenblust-Hille inequality: the case of real scalars

Abstract

The Bohnenblust-Hille inequality was obtained in 1931 and (in the case of real scalars) asserts that for every positive integer N and every m-linear mapping T:∞N×...×∞N→ R one has (Σi1,...,im=1N|T(ei1,...,eim)|2mm+1)m+12m≤ Cm, for some positive constant Cm. Since then, several authors obtained upper estimates for the values of Cm. However, the novelty presented in this short note is that we provide lower (and non-trivial) bounds for Cm.