On the Boltzmann–Grad Limit for Smooth Hard-Sphere Systems

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Foundations of Physics 48 (3):271-294 (2018)
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Abstract

The problem is posed of the prescription of the so-called Boltzmann–Grad limit operator ) for the N-body system of smooth hard-spheres which undergo unary, binary as well as multiple elastic instantaneous collisions. It is proved, that, despite the non-commutative property of the operator \, the Boltzmann equation can nevertheless be uniquely determined. In particular, consistent with the claim of Uffink and Valente that there is “no time-asymmetric ingredient” in its derivation, the Boltzmann equation is shown to be time-reversal symmetric. The proof is couched on the “ab initio” axiomatic approach to the classical statistical mechanics recently developed. Implications relevant for the physical interpretation of the Boltzmann H-theorem and the phenomenon of decay to kinetic equilibrium are pointed out.

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10.1007/s10701-018-0144-5

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Is there a reversibility paradox? Recentering the debate on the thermodynamic time arrow.Alon Drory - 2008 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 39 (4):889-913.
Is there a reversibility paradox? Recentering the debate on the thermodynamic time arrow.Alon Drory - 2008 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 39 (4):889-913.

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