Optimal estimates for summing multilinear operators
Abstract
We show that given a positive integer m, a real number p∈[ 2,∞) and 1≤ s<p the set of non--multiple ( r;s)--summing m--linear forms on p×·s× p contains, except for the null vector, a closed subspace of maximal dimension whenever r<2mss+2m-ms. This result is optimal since for r≥2mss+2m-ms all m--linear forms on p× ·s×p are multiple ( r;s)--summing. In particular, among other results, we generalize a result related to cotype (from 2010) due to Botelho et al.
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