Microscopic Foundation of Nonextensive Statistics
Abstract
Combination of the Liouville equation with the q-averaged energy Uq = <H>q leads to a microscopic framework for nonextensive q-thermodynamics. The resulting von Neumann equation is nonlinear: i=[H,q]. In spite of its nonlinearity the dynamics is consistent with linear quantum mechanics of pure states. The free energy Fq=Uq-TSq is a stability function for the dynamics. This implies that q-equilibrium states are dynamically stable. The (microscopic) evolution of is reversible for any q, but for q≠ 1 the corresponding macroscopic dynamics is irreversible.
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