Einstein-Podolsky-Rosen Steerability Criterion for Two-Qubit Density Matrices

Abstract

We propose a sufficient criterion S=λ1+λ2-(λ1-λ2)2<0 to detect Einstein-Podolsky-Rosen steering for arbitrary two-qubit density matrix AB. Here λ1,λ2 are respectively the minimal and the second minimal eigenvalues of TBAB, which is the partial transpose of AB. By investigating several typical two-qubit states such as the isotropic state, Bell-diagonal state, maximally entangled mixed state, etc., we show this criterion works efficiently and can make reasonable predictions for steerability. We also present a mixed state of which steerability always exists, and compare the result with the violation of steering inequalities.