论文信息 - Metastable behavior of stochastic dynamics: A pathwise approach

Metastable behavior of stochastic dynamics: A pathwise approach

In this paper a new approach to metastability for stochastic dynamics is proposed. The basic idea is to study the statistics of each path, performing time averages along the evolution. Metastability would be characterized by the fact that the process of these time averages converges, under a suitable rescaling, to a measure valued Markov jump process. Here this convergence is shown for the Curie-Weiss mean field dynamics and also for a model with spatial structure: Harris contact process.

[1] M. Freidlin,et al. ON SMALL RANDOM PERTURBATIONS OF DYNAMICAL SYSTEMS , 1970 .

[2] David Griffeath,et al. Additive and Cancellative Interacting Particle Systems , 1979 .

[3] David Griffeath,et al. Supercritical Contact Processes on $Z$ , 1983 .

[4] David Griffeath,et al. The basic contact processes , 1981 .

[5] J. Langer,et al. Relaxation Times for Metastable States in the Mean-Field Model of a Ferromagnet , 1966 .

[6] T. E. Harris. Contact Interactions on a Lattice , 1974 .

[7] T. E. Harris. Additive Set-Valued Markov Processes and Graphical Methods , 1978 .

[8] P. Billingsley,et al. Convergence of Probability Measures , 1969 .

[9] E. Olivieri,et al. A study of metastability in the Ising model , 1974 .

[10] O. Penrose,et al. Rigorous Treatment of the Van Der Waals-Maxwell Theory of the Liquid-Vapor Transition , 1966 .

[11] O. Penrose,et al. Rigorous treatment of metastable states in the van der Waals-Maxwell theory , 1971 .