Lifetime of oscillatory steady states

Eshel Ben‐Jacob; David J. Bergman; B. J. Matkowsky; Z. Schuss

doi:10.1103/physreva.26.2805

Abstract

We introduce a method to derive expressions for the distribution $\ensuremath{\rho}$ of large fluctuations about a stable oscillatory steady state and for the transition rate from that state into another stable state. Our method is based on a WKB-type expansion of the solution of the Fokker-Planck equation. The expression for $\ensuremath{\rho}$ has a form similar to the Boltzmann distribution with the energy replaced by a function $W$, which is the solution of a Hamilton-Jacobi-type equation. For the case of small dissipation, a simple analytical approximation to $W$, in terms of an action increment, is derived. Our results are employed to predict various measurable quantities in physical systems. Specifically we consider the problems of the physical pendulum, the shunted Josephson junction, and the transport of charge-density-wave excitations.

Keywords

WKB approximationPhysicsDissipationJosephson effectDistribution functionFokker–Planck equationType (biology)Boltzmann equationPhysical systemSteady state (chemistry)Action (physics)Double pendulumQuantum mechanicsStatistical physicsQuantum electrodynamicsDifferential equationInverted pendulumSuperconductivity

Affiliated Institutions

Related Publications

Density functionals for the strong-interaction limit

Michael Seidl , John P. Perdew , Stefan Kurth

The strong-interaction limit of density-functional (DF) theory is simple and provides information required for an accurate resummation of DF perturbation theory. Here we derive ...

2000 Physical Review A 110 citations

Information Theory and Statistical Mechanics. II

E. T. Jaynes

Treatment of the predictive aspect of statistical mechanics as a form of statistical inference is extended to the density-matrix formalism and applied to a discussion of the rel...

1957 Physical Review 3109 citations

Correlation Energy of an Electron Gas with a Slowly Varying High Density

Shang-keng Ma , K. A. Brueckner

The correlation energy (the exact energy minus the Hartree-Fock energy) of an electron gas with a high and slowly varying density is examined. The term proportional to the squar...

1968 Physical Review 415 citations

Fractional Kramers Equation

Eli Barkai , R. Silbey

We introduce a fractional Kramers equation for a particle interacting with a thermal heat bath and external nonlinear force field. For the force-free case, the velocity damping ...

2000 The Journal of Physical Chemistry B 185 citations

Theory of Plasma Oscillations. A. Origin of Medium-Like Behavior

David Böhm , Eugene P. Gross

A theory of electron oscillations of an unbounded plasma of uniform ion density is developed, taking into account the effects of random thermal motions, but neglecting collision...

1949 Physical Review 691 citations

Publication Info

Year: 1982
Type: article
Volume: 26
Issue: 5
Pages: 2805-2816
Citations: 142
Access: Closed

External Links

View on DOI.org

Social Impact

Altmetric

Lifetime of oscillatory steady states

PlumX Metrics

Social media, news, blog, policy document mentions

Citation Metrics

142

OpenAlex

Cite This

APA Style

                            
                                
                                    Eshel Ben‐Jacob, 
                                
                                    David J. Bergman, 
                                
                                    B. J. Matkowsky
                                
                                et al.
                            
                            (1982). 
                            Lifetime of oscillatory steady states. 
                            Physical review. A, General physics
                            , 26
                            (5)
                            , 2805-2816.
                            https://doi.org/10.1103/physreva.26.2805
                        

Identifiers

DOI: 10.1103/physreva.26.2805