Related papers: Entanglement negativity at the critical point of measurement-driven transition

Entanglement negativity at the critical point of measurement-driven transition

URL: http://arxiv.org/abs/2012.00040v2
Date: Mon, 30 Aug 2021 08:49:47 GMT
Title: Entanglement negativity at the critical point of measurement-driven transition
Authors: Bowen Shi, Xin Dai, Yuan-Ming Lu
Abstract summary: We numerically study the logarithmic entanglement negativity of two disjoint intervals. We identify a power-law behavior of entanglement negativity at the critical point.
Score: 8.471366736328813
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We study the entanglement behavior of a random unitary circuit punctuated by projective measurements at the measurement-driven phase transition in one spatial dimension. We numerically study the logarithmic entanglement negativity of two disjoint intervals and find that it scales as a power of the cross-ratio. We investigate two systems: (1) Clifford circuits with projective measurements, and (2) Haar random local unitary circuit with projective measurements. Remarkably, we identify a power-law behavior of entanglement negativity at the critical point. Previous results of entanglement entropy and mutual information point to an emergent conformal invariance of the measurement-driven transition. Our result suggests that the critical behavior of the measurement-driven transition is distinct from the ground state behavior of any \emph{unitary} conformal field theory.

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