Physics of Long-Range Interacting Systems
Auteurs : Campa A., Dauxois T., Fanelli D., Ruffo S.
PART I: STATIC AND EQUILIBRIUM PROPERTIES
1: Basics of statistical mechanics of short-range interacting systems
2: Equilibriumstatistical mechanics of long-range interactions
3: The large deviations method and its applications
4: Solutions of mean field models
5: Beyond mean-field models
6: Quantum long-range systems
PART II: DYNAMICAL PROPERTIES
7: BBGKY hierarchy, kinetic theories and the Boltzmann equation
8: Kinetic theory of long-range systems: Klimontovich, Vlasov and Lenard-Balescu equations
9: Out-of-equilibrium dynamics and slow relaxation
PART III: APPLICATIONS
10: Gravitational systems
11: Two-dimensional and geophysical fluid mechanics
12: Cold Coulomb systems
13: Hot plasma
14: Wave-particles interaction
15: Dipolar systems
Appendix A: Features of the main models studied throughout the book
Appendix B: Evaluation of the Laplace integral outside the analyticity strip
Appendix C: The equilibrium form of the one-particle distribution function in short-range interacting systems
Appendix D: The differential cross section of a binary collision
Appendix E: Autocorrelation of the fluctuations of the one-particle density
Appendix F: Derivation of the Fokker-Planck coefficients
Date de parution : 08-2014
Ouvrage de 428 p.
18.4x24.7 cm