We discuss recent results obtained for the Hamiltonian mean field model. The model describes a system of N fully coupled particles in one dimension and shows a second-order phase transition from a clustered phase to a homogeneous one when the energy is increased. Strong chaos is found in correspondence to the critical point on top of a weak chaotic regime which characterizes the motion at low energies. For a small region around the critical point, we find anomalous (enhanced) diffusion and Levy walks in a transient temporal regime before the system relaxes to equilibrium.
Chaotic dynamics and superdiffusion in a Hamiltonian system with many degrees of freedom
Latora V.;Rapisarda A.;
2000-01-01
Abstract
We discuss recent results obtained for the Hamiltonian mean field model. The model describes a system of N fully coupled particles in one dimension and shows a second-order phase transition from a clustered phase to a homogeneous one when the energy is increased. Strong chaos is found in correspondence to the critical point on top of a weak chaotic regime which characterizes the motion at low energies. For a small region around the critical point, we find anomalous (enhanced) diffusion and Levy walks in a transient temporal regime before the system relaxes to equilibrium.File in questo prodotto:
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