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Boltzmann-Gibbs thermal equilibrium distribution for classical systems and Newton law: A computational discussion

Authors
Publication date
1 January 2006
Publisher
'Springer Science and Business Media LLC'
Doi
    View on arXiv

    Abstract

    We implement a general numerical calculation that allows for a direct comparison between nonlinear Hamiltonian dynamics and the Boltzmann-Gibbs canonical distribution in Gibbs Γ\Gamma-space. Using paradigmatic first-neighbor models, namely, the inertial XY ferromagnet and the Fermi-Pasta-Ulam β\beta-model, we show that at intermediate energies the Boltzmann-Gibbs equilibrium distribution is a consequence of Newton second law (F=ma{\mathbf F}=m{\mathbf a}). At higher energies we discuss partial agreement between time and ensemble averages.Comment: New title, revision of the text. EPJ latex, 4 figure

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