Some improvements on the constants for the real Bohnenblust-Hille inequality

Abstract

A classical inequality due to Bohnenblust and Hille states that for every N ∈ N and every m-linear mapping U:∞N×...×∞N→C we have \[(Σi1,...,im=1N| U(ei1,...,eim)| 2mm+1) m+12m≤ Cm| U|] where Cm=2m-12. The result is also true for real Banach spaces. In this note we show that an adequate use of a recent new proof of Bohnenblust-Hille inequality, due to Defant, Popa and Schwarting, combined with the optimal constants of Khinchine's inequality (due to Haagerup) provides quite better estimates for the constants involved in the real Bohnenblust-Hille inequality. For instance, for 2≤ m≤ 14, we show that the constants Cm=2m-12 can be replaced by 2m2+6m-88m if m is even and by 2m2+6m-78m if m is odd, which substantially improve the known values of Cm. We also show that the new constants present a better asymptotic behavior.