Bilinear operator multipliers into the trace class
Abstract
Given Hilbert spaces , we consider bilinear maps defined on the cartesian product of spaces of Hilbert-Schmidt operators and valued in either the space of bounded operators, or in the space of trace class operators. We introduce modular properties of such maps with respect to the commutants of von Neumann algebras , , as well as an appropriate notion of complete boundedness for such maps. We characterize completely bounded module maps by the membership of a natural symbol of to the von Neumann algebra tensor product . In the case when is injective, we characterize completely bounded module maps by a weak factorization property, which extends to the bilinear setting a famous description of bimodule linear mappings going back to Haagerup, Effros-Kishimoto, Smith and Blecher-Smith. We make crucial use of a theorem of Sinclair-Smith on completely bounded bilinear maps valued in an injective von Neumann algebra, and provide a new proof of it, based on Hilbert -modules.
Cite
@article{arxiv.1910.06549,
title = {Bilinear operator multipliers into the trace class},
author = {Christian Le Merdy and Ivan G. Todorov and Lyudmila Turowska},
journal= {arXiv preprint arXiv:1910.06549},
year = {2020}
}
Comments
This paper replaces the one entitled "Modular operator multipliers into the trace". Besides the change of title, a few corrections have been made. To appear in Journal of Functional Analysis