English

$(p,q)$-Dominated Multilinear Operators and Laprest\'e tensor norms

Functional Analysis 2018-08-16 v1

Abstract

We introduce a notion of (p,q)(p,q)-dominated multilinear operators which stems from the geometrical approach provided by Σ\Sigma-operators. We prove that (p,q)(p,q)-dominated multilinear operators can be characterized in terms of their behavior on finite sequences and in terms of their relation with a Laprest\'e tensor norm. We also prove that they verify a generalization of the Pietsch's Domination Theorem and Kwapie\'n's Factorization Theorem. Also, we study the collection Dp,q\mathcal{D}_{p,q} of all (p,q)(p,q)-dominated multilinear operators showing that Dp,q\mathcal{D}_{p,q} has a maximal ideal demeanor and that the Laprest\'e norm has a finitely generated behavior.

Keywords

Cite

@article{arxiv.1808.04842,
  title  = {$(p,q)$-Dominated Multilinear Operators and Laprest\'e tensor norms},
  author = {M. Fernández-Unzueta and Samuel García-Hernández},
  journal= {arXiv preprint arXiv:1808.04842},
  year   = {2018}
}

Comments

22 Pages

R2 v1 2026-06-23T03:33:51.208Z