On unimodular multilinear forms with small norms on sequence spaces

Abstract

The Kahane--Salem--Zygmund inequality is a probabilistic result that guarantees the existence of special matrices with entries 1 and -1 generating unimodular m-linear forms Am,n:p1n× ·s×pmn (or C) with relatively small norms. The optimal asymptotic estimates for the smallest possible norms of Am,n when \ p1,...,pm\ ⊂2,∞] and when \ p1,...,pm\ ⊂1,2) are well-known and in this paper we obtain the optimal asymptotic estimates for the remaining case: \ p1,...,pm\ intercepts both [2,∞] and [1,2). In particular we prove that a conjecture posed by Albuquerque and Rezende is false and, using a special type of matrices that dates back to the works of Toeplitz, we also answer a problem posed by the same authors.