Optimal Hardy--Littlewood inequalities uniformly bounded by a universal constant

Abstract

The Hardy--Littlewood inequality for m-linear forms on p spaces and m<p≤ 2m asserts that equation* ( Σj1,...,jm=1∞ T( ej1,… ,ejm) pp-m) p-mp≤ 2m-12 T equation* for all continuous m-linear forms T: p× ·s × p→ R or C. The case m=2 recovers a classical inequality proved by Hardy and Littlewood in 1934. As a consequence of the results of the present paper we show that the same inequality is valid with 2m-12 replaced by 2( m-1) ( p-m) p. In particular, for m<p≤ m+1 the optimal constants of the above inequality are uniformly bounded by 2.