B. Markiv, R. Tokarchuk, P. Kostrobij, M. Tokarchuk
Published 2010-08-29Version 1
The generalization of the Zubarev nonequilibrium statistical operator method for the case of Renyi statistics is proposed when the relevant statistical operator (or distribution function) is obtained based on the principle of maximum for the Renyi entropy. The nonequilibrium statistical operator and corresponding generalized transport equations for the reduced-description parameters are obtained. A consistent description of kinetic and hydrodynamic processes in the system of interacting particles is considered as an example.
Comments: 13 pages, RevTeX4-format
Journal: Physica A: Statistical Mechanics and its Applications 390 (2011), pp. 785-791
Possible Size Dependence of Distribution Functions of Classic, Boson, and Fermion Assemblies
Generalized diffusion equation with fractional derivatives within Renyi statistics
Statistical Description of Hydrodynamic Processes in Ionic Melts with taking into account Polarization Effects
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