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Two-Point Entanglement Near a Quantum Phase Transition

arXiv:cond-mat/0606126 · doi:10.1088/1751-8113/40/33/017

Abstract

In this work, we study the two-point entanglement S(i,j), which measures the entanglement between two separated degrees of freedom (ij) and the rest of system, near a quantum phase transition. Away from the critical point, S(i,j) saturates with a characteristic length scale $ξ_E$, as the distance |i-j| increases. The entanglement length $ξ_E$ agrees with the correlation length. The universality and finite size scaling of entanglement are demonstrated in a class of exactly solvable one dimensional spin model. By connecting the two-point entanglement to correlation functions in the long range limit, we argue that the prediction power of a two-point entanglement is universal as long as the two involved points are separated far enough.

published version