中文

Ground-State Entanglement in Interacting Bosonic Graphs

量子物理 2009-11-10 v1

摘要

We consider a collection of bosonic modes corresponding to the vertices of a graph Γ.\Gamma. Quantum tunneling can occur only along the edges of Γ\Gamma and a local self-interaction term is present. Quantum entanglement of one vertex with respect the rest of the graph is analyzed in the ground-state of the system as a function of the tunneling amplitude τ.\tau. The topology of Γ\Gamma plays a major role in determining the tunneling amplitude τ\tau^* which leads to the maximum ground-state entanglement. Whereas in most of the cases one finds the intuitively expected result τ=\tau^*=\infty we show that it there exists a family of graphs for which the optimal value ofτ\tau is pushed down to a finite value. We also show that, for complete graphs, our bi-partite entanglement provides useful insights in the analysis of the cross-over between insulating and superfluid ground states

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引用

@article{arxiv.quant-ph/0311058,
  title  = {Ground-State Entanglement in Interacting Bosonic Graphs},
  author = {Paolo Giorda and Paolo Zanardi},
  journal= {arXiv preprint arXiv:quant-ph/0311058},
  year   = {2009}
}

备注

5 pages (LaTeX) 5 eps figures included