中文

Mutually Unbiased Bases and Trinary Operator Sets for N Qutrits

量子物理 2009-11-10 v2

摘要

A complete orthonormal basis of N-qutrit unitary operators drawn from the Pauli Group consists of the identity and 9^N-1 traceless operators. The traceless ones partition into 3^N+1 maximally commuting subsets (MCS's) of 3^N-1 operators each, whose joint eigenbases are mutually unbiased. We prove that Pauli factor groups of order 3^N are isomorphic to all MCS's, and show how this result applies in specific cases. For two qutrits, the 80 traceless operators partition into 10 MCS's. We prove that 4 of the corresponding basis sets must be separable, while 6 must be totally entangled (and Bell-like). For three qutrits, 728 operators partition into 28 MCS's with less rigid structure allowing for the coexistence of separable, partially-entangled, and totally entangled (GHZ-like) bases. However, a minimum of 16 GHZ-like bases must occur. Every basis state is described by an N-digit trinary number consisting of the eigenvalues of N observables constructed from the corresponding MCS.

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引用

@article{arxiv.quant-ph/0403095,
  title  = {Mutually Unbiased Bases and Trinary Operator Sets for N Qutrits},
  author = {Jay Lawrence},
  journal= {arXiv preprint arXiv:quant-ph/0403095},
  year   = {2009}
}

备注

LaTeX, 10 pages, 2 references added