Sinkhorn-Knopp theorem for rectangular positive maps
Abstract
In this work, we adapt Sinkhorn-Knopp theorem for rectangular positive maps . We extend their concepts of support and total support to these maps. We show that a positive map is equivalent to a doubly stochastic map if and only if is equivalent to a positive map with total support. Moreover, if and are coprime then is equivalent to a doubly stochastic map if and only if has support. This result provides a necessary and sufficient condition for the filter normal form, which is commonly used in Quantum Information Theory in order to simplify the task of detecting entanglement. Let be a state and be the positive map . We show that can be put in the filter normal form if and only if is equivalent to a positive map with total support. We prove that any state such that , if , and , if , can be put in the filter normal form. Recently, a connection between the capacity of a rectangular positive map and the capacity of a certain square positive map was noticed. Here, we obtain a deeper connection between these maps. As a corollary of our main results, we prove that is equivalent to a doubly stochastic map if and only if is equivalent to a doubly stochastic map.
Cite
@article{arxiv.1609.07083,
title = {Sinkhorn-Knopp theorem for rectangular positive maps},
author = {Daniel Cariello},
journal= {arXiv preprint arXiv:1609.07083},
year = {2018}
}