Large Time Dynamics of a Classical System Subject to a Fast Varying Force

• Published in: Communications in mathematical physics Vol. 276; no. 1; pp. 23 - 49
• Main Authors: Castella, F., Degond, P., Goudon, Th
• Format: Journal Article
• Language: English
• Published: Heidelberg Springer 01.11.2007; Springer Verlag
• Subjects: Analysis of PDEs; Exact sciences and technology; Global analysis, analysis on manifolds; Mathematical analysis; Mathematical methods in physics; Mathematics; Other topics in mathematical methods in physics; Partial differential equations; Physics; Sciences and techniques of general use; Topology. Manifolds and cell complexes. Global analysis and analysis on manifolds; Kinetic equations; Hamiltonians; Asymptotic behavior; Homogenization; Diffusion process; Evolution equation; Diffusion equation; Asymptotic solution; Mathematical physics; RANDOM-MEDIA; TRANSPORT-EQUATIONS; KINETIC-EQUATIONS; APPROXIMATION; QUANTUM BOLTZMANN-EQUATION; CONVERGENCE; VON-NEUMANN-EQUATION; DETERMINISTIC FRAMEWORK; BLOCH MODEL; HOMOGENIZATION
• ISSN: 0010-3616; 1432-0916
• DOI: 10.1007/s00220-007-0339-7

We investigate the asymptotic behavior of solutions to a kinetic equation describing the evolution of particles subject to the sum of a fixed, confining, Hamiltonian, and a small, time-oscillating, perturbation. The equation also involves an interaction operator which acts as a relaxation in the energy variable. This paper aims at providing a classical counterpart to the derivation of rate equations from the atomic Bloch equations. In the present classical setting, the homogenization procedure leads to a diffusion equation in the energy variable, rather than a rate equation, and the presence of the relaxation operator regularizes the limit process, leading to finite diffusion coefficients. The key assumption is that the time-oscillatory perturbation should have well-defined long time averages: our procedure includes general "ergodic" behaviors, amongst which periodic, or quasi-periodic potentials only are a particular case.