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4 - Quantum versus Classical Information

from Part II - Information and Quantum Mechanics

Published online by Cambridge University Press:  04 July 2017

By
Jeffrey Bub
Edited by
Olimpia Lombardi ,
Sebastian Fortin ,
Federico Holik  and
Cristian López
Olimpia Lombardi
Affiliation:
University of Buenos Aires, Argentina, and National Council of Scientific and Technical Research
Sebastian Fortin
Affiliation:
University of Buenos Aires, Argentina, and National Council of Scientific and Technical Research
Federico Holik
Affiliation:
National University of La Plata, Argentina, and National Council of Scientific and Technical Research
Cristian López
Affiliation:
University of Buenos Aires, Argentina, and National Council of Scientific and Technical Research
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Chapter
Information
What is Quantum Information? , pp. 79 - 92
Publisher: Cambridge University Press
Print publication year: 2017

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References

Bell, J. S. (1964). ‘On the Einstein-Podolski-Rosen Paradox’. Physics, 1: 195200.Google Scholar
Colbeck, R. and Renner, R. (2011). ‘No Extension of Quantum Theory Can Have Improved Predictive Power’. Nature Communications, 2: 411.Google Scholar
Colbeck, R. and Renner, R. (2012). ‘Free Randomness Can be Amplified’. Nature Physics, 7: 450454.Google Scholar
Einstein, A. (1948). ‘Quanten-Mechanik und Wirklichkeit’. Dialectica, 2: 320324. English translation: ‘Quantum Mechanics and Reality’. Pp. 168173 in Born, M. (ed.), The Born-Einstein Letters. New York: Walker.Google Scholar
Gleason, A. N. (1957). ‘Measures on the Closed Subspaces of Hilbert Space’. Journal of Mathematics and Mechanics, 6: 885893.Google Scholar
Heisenberg, W. (1925). ‘Über Quantentheoretischer Umdeutung Kinematischer und Mechanischer Beziehungen’. Zeitschrift für Physik, 33: 879893.Google Scholar
Popescu, S. (2014). ‘Nonlocality beyond Quantum Mechanics’. Nature Physics, 10: 264270.Google Scholar
Schrödinger, E. (1935). ‘Discussion of Probability Relations Between Separated Systems’. Proceedings of the Cambridge Philosophical Society, 31: 555563.Google Scholar
Schumacher, B. (1995). ‘Quantum Coding’. Physical Review A, 51: 27382747.Google Scholar
Shannon, C. E. (1948). ‘A Mathematical Theory of Communication’. Bell System Technical Journal, 27: 379423, 623656.Google Scholar
Von Neumann, J. (1962). ‘Quantum Logics (Strict- and Probability-Logics)’. Pp. 195197 in von Neumann, J., Collected Works, Vol. 4. New York: Macmillan.Google Scholar

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