We study how the realignment criterion (also called computable cross-norm criterion) succeeds asymptotically in detecting whether random states are separable or entangled. We consider random states on \Cd⊗\Cd obtained by partial tracing a Haar-distributed random pure state on \Cd⊗\Cd⊗\Cs over an ancilla space \Cs. We show that, for large d, the realignment criterion typically detects entanglement if and only if s≤(8/3π)2d2. In this sense, the realignment criterion is asymptotically weaker than the partial transposition criterion.
@article{arxiv.1203.3974,
title = {Realigning random states},
author = {Guillaume Aubrun and Ion Nechita},
journal= {arXiv preprint arXiv:1203.3974},
year = {2015}
}