中文

Optimal simulation of two-qubit Hamiltonians using general local operations

量子物理 2009-11-07 v2

摘要

We consider the simulation of the dynamics of one nonlocal Hamiltonian by another, allowing arbitrary local resources but no entanglement nor classical communication. We characterize notions of simulation, and proceed to focus on deterministic simulation involving one copy of the system. More specifically, two otherwise isolated systems AA and BB interact by a nonlocal Hamiltonian HHA+HBH \neq H_A+H_B. We consider the achievable space of Hamiltonians HH' such that the evolution eiHte^{-iH't} can be simulated by the interaction HH interspersed with local operations. For any dimensions of AA and BB, and any nonlocal Hamiltonians HH and HH', there exists a scale factor ss such that for all times tt the evolution eiHste^{-iH'st} can be simulated by HH acting for time tt interspersed with local operations. For 2-qubit Hamiltonians HH and HH', we calculate the optimal ss and give protocols achieving it. The optimal protocols do not require local ancillas, and can be understood geometrically in terms of a polyhedron defined by a partial order on the set of 2-qubit Hamiltonians.

关键词

引用

@article{arxiv.quant-ph/0107035,
  title  = {Optimal simulation of two-qubit Hamiltonians using general local operations},
  author = {C. H. Bennett and J. I. Cirac and M. S. Leifer and D. W. Leung and N. Linden and S. Popescu and G. Vidal},
  journal= {arXiv preprint arXiv:quant-ph/0107035},
  year   = {2009}
}

备注

(1) References to related work, (2) protocol to simulate one two-qudit Hamiltonian with another, and (3) other related results added. Some proofs are simplified