Grothendieck's theorem for absolutely summing multilinear operators is optimal

Abstract

Grothendieck's theorem asserts that every continuous linear operator from 1 to 2 is absolutely ( 1;1) -summing. In this note we prove that the optimal constant gm so that every continuous m-linear operator from 1×·s×1 to 2 is absolutely ( gm;1) -summing is 2m+1. We also show that if gm<2m+1 there is c dimensional linear space composed by continuous non absolutely ( gm;1) -summing m-linear operators from 1×·s×1 to 2. In particular, our result solves (in the positive) a conjecture posed by A.T. Bernardino in 2011.