Disappearance of entanglement: a topological point of view

TL;DR

This paper provides a topological framework for classifying how entanglement can disappear in quantum systems, using geometric visualization and topology to understand different decay behaviors and transitions.

Contribution

It introduces a topological classification scheme for entanglement evolution, linking geometric and topological features to entanglement decay, sudden death, and birth.

Findings

Four categories of entanglement disappearance identified

Transitions between behaviors are topologically driven

Model illustrates visualization of topological entanglement dynamics

Abstract

We give a topological classification of the evolution of entanglement, particularly the different ways the entanglement can disappear. Four categories exhaust all possibilities given the initial quantum state is entangled and the final one is not. Exponential decay of entanglement, entanglement sudden death and sudden birth can all be understood and visualized in the associated geometrical picture - the polarization vector representation. The entanglement evolution categories of any model are determined by the topology of the state space, the limiting state and the memory effect of the environment. Transitions between these types of behaviors as a function of physical parameters are also possible. These transitions are thus of topological nature. We illustrate the general concepts with a visualizable model.