Title of article
Variational methods for time-dependent classical many-particle systems
Author/Authors
Sereda، نويسنده , , Yuriy V. and Ortoleva، نويسنده , , Peter J.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2013
Pages
11
From page
628
To page
638
Abstract
A variational method for the classical Liouville equation is introduced that facilitates the development of theories for non-equilibrium classical systems. The method is based on the introduction of a complex-valued auxiliary quantity Ψ that is related to the classical position-momentum probability density ρ via ρ = Ψ ∗ Ψ . A functional of Ψ is developed whose extrema imply that ρ satisfies the Liouville equation. Multiscale methods are used to develop trial functions to be optimized by the variational principle. The present variational principle with multiscale trial functions can capture both the microscopic and the coarse-grained descriptions, thereby yielding theories that account for the two way exchange of information across multiple scales in space and time. Equations of the Smoluchowski form for the coarse-grained state probability density are obtained. Constraints on the initial state of the N -particle probability density for which the aforementioned equation is closed and conserves probability are presented. The methodology has applicability to a wide range of systems including macromolecular assemblies, ionic liquids, and nanoparticles.
Keywords
variational principle , Non-equilibrium systems , N -particle probability density , Coarse-grained variables , multiscale analysis , Liouville equation
Journal title
Physica A Statistical Mechanics and its Applications
Serial Year
2013
Journal title
Physica A Statistical Mechanics and its Applications
Record number
1736499
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