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arxiv: 1407.6052 · v1 · pith:XP2OMUCZ · submitted 2014-07-22 · cond-mat.stat-mech

Boltzmann-Gibbs entropy is sufficient but not necessary for the likelihood factorization required by Einstein

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classification cond-mat.stat-mech
keywords entropylikelihoodboltzmanneinsteinfactrequirementsubsystemsadditive
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In 1910 Einstein published a crucial aspect of his understanding of Boltzmann entropy. He essentially argued that the likelihood function of any system composed by two probabilistically independent subsystems {\it ought} to be factorizable into the likelihood functions of each of the subsystems. Consistently he was satisfied by the fact that Boltzmann (additive) entropy fulfills this epistemologically fundamental requirement. We show here that entropies (e.g., the $q$-entropy on which nonextensive statistical mechanics is based) which generalize the BG one through violation of its well known additivity can {\it also} fulfill the same requirement. This fact sheds light on the very foundations of the connection between the micro- and macro-scopic worlds.

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