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Braiding transformation, entanglement swapping and Berry phase in entanglement space

arXiv:0704.0709 · doi:10.1103/PhysRevA.76.042324

Abstract

We show that braiding transformation is a natural approach to describe quantum entanglement, by using the unitary braiding operators to realize entanglement swapping and generate the GHZ states as well as the linear cluster states. A Hamiltonian is constructed from the unitary $\check{R}_{i,i+1}(θ,ϕ)$-matrix, where $ϕ=ωt$ is time-dependent while $θ$ is time-independent. This in turn allows us to investigate the Berry phase in the entanglement space.

6 pages, 2 figures. Published version