Author : Radu Balescu
Publisher : World Scientific
ISBN 13 : 1783262613
Total Pages : 340 pages
Book Rating : 4.18/5 ( download)
Book Synopsis Statistical Dynamics by : Radu Balescu
Download or read book Statistical Dynamics written by Radu Balescu and published by World Scientific. This book was released on 1997-04-19 with total page 340 pages. Available in PDF, EPUB and Kindle. Book excerpt: In the first part of this book, classical nonequilibrium statistical mechanics is developed. Starting from the Hamiltonian dynamics of the molecules, it leads through the irreversible kinetic equations to the level of fluid mechanics. For simple systems, all the transport coefficients are determined by the molecular properties. The second part of the book treats complex systems that require a more extensive use of statistical concepts. Such problems, which are at the forefront of research, include: continuous time random walks, non-Markovian diffusion processes, percolation and related critical phenomena, transport on fractal structures, transport and deterministic chaos. These “strange transport processes” differ significantly from the usual (diffusive) transport. Their inclusion in a general treatise on statistical mechanics is a special feature of this invaluable book. Contents: States, Dynamical Functions, EvolutionGeneral Formalism of Statistical MechanicsReduced Distribution Functions and Correlation FunctionsThe Mean Field ApproximationThe Weak Coupling Kinetic EquationKinetic Equation for Dilute GasesKinetic Equation for PlasmasProperties of Kinetic EquationsHydrodynamics and TransportTransport and Autocorrelation FunctionsRandom Walks and TransportCritical PhenonenaTransport on Percolation StructuresChaos and Transport Readership: Students and researchers in statistical physics, plasma physics, theoretical physics, mathematical physics, classical mechanics, continuum mechanics, chaos/dynamical systems, and materials science. Keywords:Statistical Mechanics (Non-Equilibrium);Kinetic Theory (of Gases, of Plasmas);Transport Theory;Diffusion;Stochastic Processes;Percolation;Anomalous Transport;Hamiltonian Maps