Conditional quantum entropy: Difference between revisions

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Line 1: {{Short description\|Measure of relative information in quantum information theory}} The '''conditional quantum entropy''' is an [[entropy measure]] used in [[quantum information theory]]. It is a generalization of the [[conditional entropy]] of [[classical information theory]]. For a bipartite state <math>\rho^{AB}</math>, the conditional entropy is written <math>S(A\|B)_\rho</math>, or <math>H(A\|B)_\rho</math>, depending on the notation being used for the [[von Neumann entropy]]. The quantum conditional entropy was defined in terms of a conditional density operator <math> \rho_{A\|B} </math> by [[Nicolas Cerf]] and [[Chris Adami]],<ref ~~name="negent"~~>{{~~cite~~Cite journal \| ~~url~~last1=~~http://prl.aps~~Cerf\|first1=N.~~org/abstract/PRL/v79/i26/p5194_1~~ J.\|last2=Adami\|first2=C.\|date=1997\| title = Negative ~~entropy~~Entropy and ~~information~~Information in ~~quantum~~Quantum ~~mechanics~~Mechanics\| ~~publisher~~ journal= [[Physical Review Letters]]\| ~~year~~ volume= ~~1997~~79\|issue=26\|pages=5194–5197\|doi=10.1103/physrevlett.79.5194\|arxiv=quant-ph/9512022\|bibcode=1997PhRvL..79.5194C\|s2cid=14834430}}</ref><ref>{{~~cite~~Cite journal \| ~~url~~last1=~~http://pra.aps~~Cerf\|first1=N.~~org/abstract/PRA/v60/i2/p893_1~~ J.\|last2=Adami\|first2=C.\|date=1999-08-01\| title = Quantum extension of conditional probability\| ~~publisher~~ journal= [[Physical Review A]]\| ~~year~~ volume=60\|issue=2\|pages=893–897\|doi=10.1103/PhysRevA.60.893\|arxiv=quant-ph/9710001\|bibcode=1999PhRvA..60..893C\|s2cid=119451904 ~~1999~~}}</ref> who showed that quantum conditional entropies can be negative, something that is forbidden in classical physics. The negativity of quantum conditional entropy is a sufficient criterion for quantum [[Separable state\|non-separability]]. In what follows, we use the notation <math>S(\cdot)</math> for the [[von Neumann entropy]], which will simply be called "entropy". Line 9 ⟶ 10: By analogy with the classical conditional entropy, one defines the conditional quantum entropy as <math>S(A\|B)_\rho \ \stackrel{\mathrm{def}}{=}\ S(AB)_\rho - S(B)_\rho</math>. An equivalent ~~(and more intuitive)~~ operational definition of the quantum conditional entropy (as a measure of the [[quantum communication]] cost or surplus when performing [[quantum state]] merging) was given by [[Michał Horodecki]], [[Jonathan Oppenheim]], and [[Andreas Winter]].<ref>{{Cite injournal\|last1=Horodecki\|first1=Michał\|last2=Oppenheim\|first2=Jonathan\|last3=Winter\|first3=Andreas\|title=Partial ~~their~~quantum ~~paper "Quantum Information can be negative" [http://~~information\|journal=Nature\|volume=436\|issue=7051\|pages=673–676\|arxiv~~.org/abs/~~=quant-ph/0505062]\|doi=10.1038/nature03909\|bibcode=2005Natur.436..673H\|year=2005\|pmid=16079840\|s2cid=4413693}}</ref> ==Properties== Line 17 ⟶ 18: ==References== {{reflist}} * {{Cite book\|title=Quantum Computation and Quantum Information\|last1=Nielsen\|first=Michael A.\|last2=Chuang\|first2=Isaac L.\|publisher=Cambridge University Press\|year=2010\|isbn=978-1-107-00217-3\|edition=2nd\|___location=Cambridge\|oclc=844974180\|author-link=Michael Nielsen\|author-link2=Isaac Chuang\|title-link=Quantum Computation and Quantum Information (book)}} ~~Nielsen, Michael A. and [[Isaac L. Chuang]] (2000). ''Quantum Computation and Quantum Information''. Cambridge University Press, ISBN 0-521-63503-9.~~ {{citation\|first=Mark M.\|last=Wilde\|arxiv=1106.1445\|title=Quantum Information Theory\|pages=xi-xii\|year=2017\|publisher=Cambridge University Press\|bibcode = 2011arXiv1106.1445W \|doi=10.1017/9781316809976.001\|chapter=Preface to the Second Edition\|isbn=9781316809976\|s2cid=2515538 }} {{cite book ~~\| first = Mark~~ ~~\| last = Wilde~~ ~~\| title = Quantum Information Theory~~ ~~\| url= http://www.amazon.com/Quantum-Information-Theory-Mark-Wilde/dp/1107034256~~ ~~\| publisher = Cambridge University Press~~ ~~\| year = 2013~~ }} [[Category:Quantum mechanical entropy]]