English

Regular operators between non-commutative $L_p$-spaces

Functional Analysis 2016-09-06 v1

Abstract

We introduce the notion of a regular mapping on a non-commutative LpL_p-space associated to a hyperfinite von Neumann algebra for 1p1\le p\le \infty. This is a non-commutative generalization of the notion of regular or order bounded map on a Banach lattice. This extension is based on our recent paper [P3], where we introduce and study a non-commutative version of vector valued LpL_p-spaces. In the extreme cases p=1p=1 and p=p=\infty, our regular operators reduce to the completely bounded ones and the regular norm coincides with the cbcb-norm. We prove that a mapping is regular iff it is a linear combination of bounded, completely positive mappings. We prove an extension theorem for regular mappings defined on a subspace of a non-commutative LpL_p-space. Finally, let RpR_p be the space of all regular mappings on a given non-commutative LpL_p-space equipped with the regular norm. We prove the isometric identity Rp=(R,R1)θR_p=(R_\infty,R_1)^\theta where θ=1/p\theta=1/p and where ( . , . )θ(\ .\ ,\ .\ )^\theta is the dual variant of Calder\'on's complex interpolation method.

Keywords

Cite

@article{arxiv.math/9308207,
  title  = {Regular operators between non-commutative $L_p$-spaces},
  author = {Gilles Pisier},
  journal= {arXiv preprint arXiv:math/9308207},
  year   = {2016}
}