Thursday, April 25, 2013

1110.6128 (Yuri Campbell et al.)

Classical Hierarchical Correlation Quantification on Tripartite Qubit
Mixed State Families
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Yuri Campbell, José Roberto Castilho Piqueira
There are at least a number of ways to formally define complexity. Most of them relate to some kind of minimal description of the studied object. Being this one in form of minimal resources of minimal effort needed to generate the object itself. This is usually achieved by detecting and taking advantage of regularities within the object. Regularities can commonly be described in an information-theoretic approach by quantifying the amount of correlation playing a role in the system, this being spatial, temporal or both. This is the approach closely related to the extent that the whole cannot be understood as only the sum of its parts, but also by their interactions. Feature considered to be most fundamental. Nevertheless, this irreducibility, even in the basic quantum informational setting of composite states, is also present due to the intrinsic structure of Hilbert spaces' tensor product. In this approach, this irreducibility is quantified based on statistics of von Neumann measurements forming mutually unbiased bases. Upon two different kinds of tripartite qubit mixed state families, which hold the two possible distinct entangled states on this space. Results show that this quantification is sensible to the different kind of entanglement present on those families.
View original: http://arxiv.org/abs/1110.6128

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