Analytic Lyapunov exponents in a classical nonlinear field equation
Year: 2000
Authors: Franzosi R., Gatto R., Pettini G., Pettini M.
Autors Affiliation: Dipartimento di Fisica dell’Università, Largo Enrico Fermi 2, 50125 Firenze, Italy; Departement de Physique Théorique, Université de Genève, 24 Quai Ernest-Ansermet, CH-1211 Geneve, Switzerland; Osservatorio Astrofisico di Arcetri, Largo Enrico Fermi 5, 50125 Firenze, Italy
Abstract: It is shown that the nonlinear wave equation partial derivative(t)(2)phi-partial derivative(x)(2)phi-mu(0)partial derivative(x)(partial derivative(x)phi)(3)=0, which is the continuum limit of the Fermi-Pasta-Ulam beta model, has a positive Lyapunov exponent lambda(1), whose analytic energy dependence is given. The result (a first example for field equations) is achieved by evaluating the lattice-spacing dependence of lambda(1) for the FPU model within the framework of a Riemannian description of Hamiltonian chaos. We also discuss a difficulty of the statistical mechanical treatment of this classical field system, which is absent in the dynamical description.
Journal/Review: PHYSICAL REVIEW E
Volume: 61 (4) Pages from: R3299 to: R3302
KeyWords: Differential equations; Lyapunov functions; Lyapunov methods; Nonlinear equations, Continuum limits; Energy dependence; Hamiltonian chaos; Lyapunov exponent; Nonlinear field equations; Nonlinear wave equation; Spacing dependence; Statistical mechanical treatment, HamiltoniansDOI: 10.1103/PhysRevE.61.R3299ImpactFactor: 2.142Citations: 3data from “WEB OF SCIENCE” (of Thomson Reuters) are update at: 2024-11-24References taken from IsiWeb of Knowledge: (subscribers only)Connecting to view paper tab on IsiWeb: Click hereConnecting to view citations from IsiWeb: Click here