Macroscopically local correlations can violate information causality.

Although quantum mechanics is a very successful theory, its foundations are still a subject of intense debate. One of the main problems is that quantum mechanics is based on abstract mathematical axioms, rather than on physical principles. Quantum information theory has recently provided new ideas from which one could obtain physical axioms constraining the resulting statistics one can obtain in experiments. Information causality (IC) and macroscopic locality (ML) are two principles recently proposed to solve this problem. However, none of them were proven to define the set of correlations one can observe. In this study, we show an extension of IC and study its consequences. It is shown that the two above-mentioned principles are inequivalent: if the correlations allowed by nature were the ones satisfying ML, IC would be violated. This gives more confidence in IC as a physical principle, defining the possible correlation allowed by nature.

[1]  A. J. Short,et al.  Quantum nonlocality and beyond: limits from nonlocal computation. , 2007, Physical review letters.

[2]  A. Acín,et al.  A convergent hierarchy of semidefinite programs characterizing the set of quantum correlations , 2008, 0803.4290.

[3]  M. Pawłowski,et al.  Recovering part of the boundary between quantum and nonquantum correlations from information causality , 2009 .

[4]  M. Navascués,et al.  A glance beyond the quantum model , 2009, Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences.

[5]  John B. Shoven,et al.  I , Edinburgh Medical and Surgical Journal.

[6]  S. Wehner,et al.  The Uncertainty Principle Determines the Nonlocality of Quantum Mechanics , 2010, Science.

[7]  S. Massar,et al.  Nonlocal correlations as an information-theoretic resource , 2004, quant-ph/0404097.

[8]  J. Bell On the Einstein-Podolsky-Rosen paradox , 1964 .

[9]  A. Winter,et al.  Information causality as a physical principle , 2009, Nature.

[10]  S. Popescu,et al.  Quantum nonlocality as an axiom , 1994 .

[11]  H. Buhrman,et al.  Limit on nonlocality in any world in which communication complexity is not trivial. , 2005, Physical review letters.

[12]  A. Acín,et al.  Bounding the set of quantum correlations. , 2006, Physical review letters.

[13]  H. Erlichson The Einstein-Podolski-Rosen Paradox , 1972, Philosophy of Science.

[14]  C. Ross Found , 1869, The Dental register.

[15]  David P. DiVincenzo,et al.  Quantum information and computation , 2000, Nature.

[16]  N. Gisin,et al.  General properties of nonsignaling theories , 2005, quant-ph/0508016.

[17]  Wim van Dam Implausible consequences of superstrong nonlocality , 2012, Natural Computing.