Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuations, invalidating the key assumptions of small fluctuations and short memory time in or near equilibrium. A full knowledge of Probability Distribution Functions (PDFs), especially time-dependent PDFs, becomes essential in understanding far-from-equilibrium processes. We consider a stochastic logistic model with multiplicative noise, which has gamma distributions as stationary PDFs. We numerically solve the transient relaxation problem and show that as the strength of the stochastic noise increases, the time-dependent PDFs increasingly deviate from gamma distributions. For sufficiently strong noise, a transition occurs whereby the PDF never reac...
The most frequently used in physical application diffusive (based on the Fokker-Planck equation) mod...
This paper investigates the influence of environmental noise on the characteristic timescale of the ...
We introduce a general formulation of the fluctuation-dissipation relations (FDRs) holding also in f...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
A probabilistic description is essential for understanding growth processes in non-stationary states...
We report time-dependent Probability Density Functions (PDFs) for a nonlinear stochastic process wit...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...
We elucidate the effect of different deterministic nonlinear forces on geometric structure of stocha...
We propose a toy model for a cyclic order-disorder transition and introduce a geometric methodology ...
International audienceJaynes' information theory formalism of statistical mechanics is applied to th...
Thesis (Ph.D.)--University of Washington, 2018Stochastic dynamical systems, as a rapidly growing are...
Biological systems possess the ability to adapt quickly and adequately to both environmental and int...
We consider a model of stochastic evolution under general noisy best-response protocols, allowing th...
We derive various exact results for Markovian systems that spontaneously relax to a non-equilibrium ...
The most frequently used in physical application diffusive (based on the Fokker-Planck equation) mod...
This paper investigates the influence of environmental noise on the characteristic timescale of the ...
We introduce a general formulation of the fluctuation-dissipation relations (FDRs) holding also in f...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
A probabilistic description is essential for understanding growth processes in non-stationary states...
We report time-dependent Probability Density Functions (PDFs) for a nonlinear stochastic process wit...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...
We elucidate the effect of different deterministic nonlinear forces on geometric structure of stocha...
We propose a toy model for a cyclic order-disorder transition and introduce a geometric methodology ...
International audienceJaynes' information theory formalism of statistical mechanics is applied to th...
Thesis (Ph.D.)--University of Washington, 2018Stochastic dynamical systems, as a rapidly growing are...
Biological systems possess the ability to adapt quickly and adequately to both environmental and int...
We consider a model of stochastic evolution under general noisy best-response protocols, allowing th...
We derive various exact results for Markovian systems that spontaneously relax to a non-equilibrium ...
The most frequently used in physical application diffusive (based on the Fokker-Planck equation) mod...
This paper investigates the influence of environmental noise on the characteristic timescale of the ...
We introduce a general formulation of the fluctuation-dissipation relations (FDRs) holding also in f...