# Cohen factorable p-nuclear multilinear operators

**Authors:** Maatougui Belaala, Khalil Saadi

arXiv: 1702.01467 · 2017-02-14

## TL;DR

This paper extends the theory of p-nuclear operators to multilinear and polynomial contexts, establishing new ideals and key theorems like Pietsch domination and Cohen-Kwapien factorization.

## Contribution

It introduces multilinear and polynomial ideals for p-nuclear operators, adapting core theorems from linear operator theory to these new classes.

## Key findings

- Established Pietsch domination theorem for p-nuclear multilinear operators.
- Developed Cohen-Kwapien type factorization for p-nuclear polynomials.
- Extended the framework of p-nuclear operators to multilinear and polynomial settings.

## Abstract

Basing on the work of Pellegrino et al. on factorable strongly p-summing multilinear operators, we will continue study this class of operators and borrowing the same idea for the category of p-nuclear operators. Therefore, we will construct other multilinear and polynomial ideals for which the most valuable results of the theory of p-nuclear linear operators are available, namely the Pietsch domination theorem and the well known factorization given by Cohen and Kwapien for p-nuclear operators.

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Source: https://tomesphere.com/paper/1702.01467