# Pietsch-Maurey-Rosenthal factorization of summing multilinear operators

**Authors:** Mieczys{\l}aw Masty{\l}o, Enrique A. S\'anchez-P\'erez

arXiv: 1706.06017 · 2017-06-20

## TL;DR

This paper introduces a new class of summing multilinear operators on Banach lattices, establishing a factorization theorem under weaker convexity conditions and extending operator classes with applications to $q$-concavity.

## Contribution

It develops a novel Pietsch-Maurey-Rosenthal type factorization theorem for multilinear operators with relaxed convexity assumptions, extending the theory to special Banach lattices and tensor products.

## Key findings

- Established a weaker convexity-based factorization theorem.
- Extended multilinear operators to lattices with order continuity and $p$-convexity.
- Provided new factorization results for $q$-dominated operators.

## Abstract

The main purpose of this paper is the study of a~new class of summing multilinear operators acting from the product of Banach lattices with some nontrivial lattice convexity. A~mixed Pietsch-Maurey-Rosenthal type factorization theorem for these operators is proved under weaker convexity requirements than the ones that are needed in the Maurey-Rosenthal factorization through products of $L^q$-spaces. A~by-product of our factorization is an extension of multilinear operators defined by a~$q$-concavity type property to a~product of special Banach function lattices which inherit some lattice-geometric properties of the domain spaces, as order continuity and $p$-convexity. Factorization through Fremlin's tensor products is also analyzed. Applications are presented to study a~special class of linear operators between Banach function lattices that can be characterized by a strong version of $q$-concavity. This class contains $q$-dominated operators, and so the obtained results provide a~new factorization theorem for operators from this class.

## Full text

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## References

14 references — full list in the complete paper: https://tomesphere.com/paper/1706.06017/full.md

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Source: https://tomesphere.com/paper/1706.06017