中文

Relative $C$"-Numerical Ranges for Applications in Quantum Control and Quantum Information

数学物理 2008-12-20 v1 math.MP 量子物理

摘要

Motivated by applications in quantum information and quantum control, a new type of CC"-numerical range, the relative CC"-numerical range denoted WK(C,A)W_K(C,A), is introduced. It arises upon replacing the unitary group U(N) in the definition of the classical CC"-numerical range by any of its compact and connected subgroups KU(N)K \subset U(N). The geometric properties of the relative CC"-numerical range are analysed in detail. Counterexamples prove its geometry is more intricate than in the classical case: e.g. WK(C,A)W_K(C,A) is neither star-shaped nor simply-connected. Yet, a well-known result on the rotational symmetry of the classical CC"-numerical range extends to WK(C,A)W_K(C,A), as shown by a new approach based on Lie theory. Furthermore, we concentrate on the subgroup SUloc(2n):=SU(2)...SU(2)SU_{\rm loc}(2^n) := SU(2)\otimes ... \otimes SU(2), i.e. the nn-fold tensor product of SU(2), which is of particular interest in applications. In this case, sufficient conditions are derived for WK(C,A)W_{K}(C,A) being a circular disc centered at origin of the complex plane. Finally, the previous results are illustrated in detail for SU(2)SU(2)SU(2) \otimes SU(2).

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引用

@article{arxiv.math-ph/0702005,
  title  = {Relative $C$"-Numerical Ranges for Applications in Quantum Control and Quantum Information},
  author = {G. Dirr and U. Helmke and M. Kleinsteuber and T. Schulte-Herbrueggen},
  journal= {arXiv preprint arXiv:math-ph/0702005},
  year   = {2008}
}

备注

accompanying paper to math-ph/0701035