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100   $a20160829d2014      uy              
101 0 $aeng
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181   $ctxt
182   $cc
183   $acr
200 10$aPhysics of long-range interacting systems
210  1$aOxford :$cOxford University Press,$d2014.
215   $a1 online resource (xvi, 410 pages) $cillustrations (black and white)
300   $aBibliographic Level Mode of Issuance: Monograph
311   $a0-19-958193-2 
320   $aIncludes bibliographical references and index.
327   $aBasics of statistical mechanics of short-range interacting systems -- Equilibrium statistical mechanics of long-range interactions -- The large deviations method and its applications -- Solutions of mean field models -- Beyond mean-field models -- Quantum long-range systems -- BBGKY hierarchy, kinetic theories and the Boltzmann equation -- Kinetic theory of long-range systems: Klimontovich, Vlasov and Lenard-Balescu equations -- Out-of-equilibrium dynamics and slow relaxation -- Gravitational systems -- Two-dimensional and geophysical fluid mechanics -- Cold coulomb systems -- Hot plasma -- Wave-particles interaction -- Dipolar systems -- Appendixes: A. Features of the main models studied throughout the book -- B. Evaluation of the laplace integral outside the analyticity strip -- C. The equilibrium form of the one-particle distribution function in short-range interacting systems -- D. The differential cross-section of a binary collision -- E. Autocorrelation of the fluctuations of the one-particle density -- F. Derivation of the Fokker-Planck coefficients.
330 8 $aThis title deals with an important class of many-body systems: those where the interaction potential decays slowly for large inter-particle distance. In particular, systems where the decay is slower than the inverse inter-particle distance raised to the dimension of the embedding space. Gravitational and Coulomb interactions are the most prominent examples. However, it has become clear that long-range interactions are more common than previously thought. This has stimulated a growing interest in the study of long-range interacting systems, with a better understanding of the many peculiarities in their behaviour.
606   $aStatistical physics
606   $aSystem theory
606   $aAtomic Physics$2HILCC
606   $aPhysics$2HILCC
606   $aPhysical Sciences & Mathematics$2HILCC
615  0$aStatistical physics
615  0$aSystem theory
615  7$aAtomic Physics
615  7$aPhysics
615  7$aPhysical Sciences & Mathematics
676   $a530.13
700   $aCampa$b Alessandro$01081644
702   $aDauxois$b T
702   $aFanelli$b D
702   $aDauxois$b T
702   $aFanelli$b D
702   $aRuffo$b Stefano
801  0$bPQKB
906   $aBOOK
912   $a9910157842503321
996   $aPhysics of long-range interacting systems$92783340
997   $aUNINA