Critical Hardy--Littlewood inequality for multilinear forms

Abstract

The Hardy--Littlewood inequalities for m-linear forms on p spaces are known just for p>m. The critical case p=m was overlooked for obvious technical reasons and, up to now, the only known estimate is the trivial one. In this paper we deal with this critical case of the Hardy--Littlewood inequality. More precisely, for all positive integers m≥2 we have \[ j1( Σj2=1n( .....( Σjm=1 n T( ej1,…,ejm) sm ) 1sm· sm-1.....) 1s3s2 ) 1s2≤2m-22 T \] for all m--linear forms T:mn×·s×m n→K=R or C with sk =2m(m-1)m+mk-2k for all k=2,....,m and for all positive integers n. As a corollary, for the classical case of bilinear forms investigated by Hardy and Littlewood in 1934 our result is sharp in a strong sense (both exponents and constants are optimal for real and complex scalars).