We build the counterpart of the celebrated Nielsen's theorem for coherence
manipulation in this paper. This offers an affirmative answer to the open
question: whether, given two states $\rho$ and $\sigma$, either $\rho$ can be
transformed into $\sigma$ or vice versa under incoherent operations [Phys. Rev.
Lett. \textbf{113}, 140401(2014)]. As a consequence, we find that there exist
essentially different types of coherence. Moreover, incoherent operations can
be enhanced in the presence of certain coherent states. These extra states are
coherent catalysts: they allow uncertain incoherent operations to be realized,
without being consumed in any way. Our main result also sheds a new light on
the construction of coherence measures.Comment: arXiv admin note: text overlap with arXiv:1311.0275 by other authors.
03.65.Ud, 03.67.Ta. in Physical Review A 201
We discuss a general strategy to construct coherence measures. One can build an important class of coherence measures which cover the relative entropy measure for pure states, the l1-norm measure for pure states and the α-entropy measure. The optimal conversion of coherent states under incoherent operations is presented which sheds some light on the coherence of a single copy of a pure state.
An entangled basis with fixed Schmidt number k (EBk) is a set of orthonormal basis states with the same Schmidt number k in a product Hilbert spaceIt is a generalization of both the product basis and the maximally entangled basis. We show here that, for any k ≤ min{d,Consequently, general methods of constructing SEBk (EBk with the same Schmidt coefficients) and EBk (but not SEBk) are proposed. Moreover, we extend the concept of EBk to multipartite case and find out that the multipartite EBk can be constructed similarly.
We found that the Wigner-Yanase skew information, which has been recently proposed as a measure of coherence in [Phys. Rev. Lett. 113, 170401(2014)], can increase under a class of operations which may be interpreted as incoherent following the framework of Baumgratz et al., while being phase sensitive.
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