We consider a finite region of a lattice of weakly interacting geodesic flows
on manifolds of negative curvature and we show that, when rescaling the
interactions and the time appropriately, the energies of the flows evolve
according to a non linear diffusion equation. This is a first step toward the
derivation of macroscopic equations from a Hamiltonian microscopic dynamics in
the case of weakly coupled systems

C. Bernardin

C. Liverani

C.B. Croke

Carlangelo Liverani

D. Dolgopyat

D. Revuz

D.V. Anosov

Dmitry Dolgopyat

G. Basile

G.P. Paternain

H. Spohn

J. Bricmont

J. Lukkarinen

J.-L. Journé

J.-P. Eckmann

K. Aoki

M.Z. Guo

P. Collet

P. Gaspard

T.J. Hunt

English

arXiv

Abstract. We consider a finite region of a lattice of weakly interacting geodesic flows on manifolds of negative curvature and we show that, when rescaling the interactions and the time appropriately, the energies of the flows evolve according to a non linear diffusion equation. This is a first step toward the derivation of macroscopic equations from a Hamiltonian microscopic dynamics in the case of weakly coupled systems

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Energy transfer in a fast-slow Hamiltonian system

We consider a finite region of a lattice of weakly interacting geodesic flows on manifolds of negative curvature and we show that, when rescaling the interactions and the time appropriately, the energies of the flows evolve according to a non linear diffusion equation. This is a first step toward the derivation of macroscopic equations from a Hamiltonian microscopic dynamics in the case of weakly coupled systems

Energy transfer in a fast-slow Hamiltonian system

Abstract

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