Add to ORKGWe consider a Ginzburg–Landau partial differential equation in a bounded inter-val, perturbed by weak spatio–temporal noise. As the interval length increases, a transition between activation regimes occurs, in which the classical Kramers rate di-verges [MS01]. We determine a corrected Kramers formula at the transition point, yielding a finite, though noise-dependent rate prefactor, confirming a conjecture by Maier and Stein [MS03]. For both periodic and Neumann boundary conditions, we obtain explicit expressions for the prefactor in terms of Bessel and error functions.
An effect of multiplicative noise in the time-dependent Ginzburg-Landau model is reported, namely, t...
Nesta Dissertação apresentamos um estudo numéerico em uma dimensão espacial da equação de Ginzburg-L...
We study the limit of high activation energy of a special Fokker–Planck equation known as the Kramer...
We consider a Ginzburg–Landau partial differential equation in a bounded inter-val, perturbed by wea...
International audienceIn the small noise regime, the average transition time between metastable stat...
We investigate a pattern-forming system close to a Hopf bifurcation with broken translational symmet...
We demonstrate that the classical Kramers' escape problem can be extended to describe a bistable sys...
2n this work we introduce a spatio-temporal bounded noise derived by the sine-Wiener noise and by th...
The characteristic size for spatial structure, that emerges when the bifurcation parameter in model ...
Noise-induced escape from the metastable part of a potential is considered on time scales preceding ...
We consider a Ginzburg-Landau equation in the interval [-epsilon(-kappa), epsilon(-kappa)], epsilon ...
Noise-induced escape from the metastable part of a potential is considered on time scales preceding ...
2In this work, we introduce two spatiotemporal colored bounded noises, based on the zero-dimensional...
We analyze several aspects of a reaction-diffusion equation in two space dimensions with cubic nonli...
Kramers ’ law describes the mean transition time of an overdamped Brownian par-ticle between local m...
An effect of multiplicative noise in the time-dependent Ginzburg-Landau model is reported, namely, t...
Nesta Dissertação apresentamos um estudo numéerico em uma dimensão espacial da equação de Ginzburg-L...
We study the limit of high activation energy of a special Fokker–Planck equation known as the Kramer...
We consider a Ginzburg–Landau partial differential equation in a bounded inter-val, perturbed by wea...
International audienceIn the small noise regime, the average transition time between metastable stat...
We investigate a pattern-forming system close to a Hopf bifurcation with broken translational symmet...
We demonstrate that the classical Kramers' escape problem can be extended to describe a bistable sys...
2n this work we introduce a spatio-temporal bounded noise derived by the sine-Wiener noise and by th...
The characteristic size for spatial structure, that emerges when the bifurcation parameter in model ...
Noise-induced escape from the metastable part of a potential is considered on time scales preceding ...
We consider a Ginzburg-Landau equation in the interval [-epsilon(-kappa), epsilon(-kappa)], epsilon ...
Noise-induced escape from the metastable part of a potential is considered on time scales preceding ...
2In this work, we introduce two spatiotemporal colored bounded noises, based on the zero-dimensional...
We analyze several aspects of a reaction-diffusion equation in two space dimensions with cubic nonli...
Kramers ’ law describes the mean transition time of an overdamped Brownian par-ticle between local m...
An effect of multiplicative noise in the time-dependent Ginzburg-Landau model is reported, namely, t...
Nesta Dissertação apresentamos um estudo numéerico em uma dimensão espacial da equação de Ginzburg-L...
We study the limit of high activation energy of a special Fokker–Planck equation known as the Kramer...