The following pages link to (Q2920740):
Displaying 18 items.
- Stochastic CGL equations without linear dispersion in any space dimension (Q378030) (← links)
- Exponential mixing for the white-forced damped nonlinear wave equation (Q478987) (← links)
- Exponential ergodicity and regularity for equations with Lévy noise (Q655319) (← links)
- A coupling approach to randomly forced nonlinear PDE's. II (Q1850158) (← links)
- Exponential mixing properties of stochastic PDEs through asymptotic coupling (Q1864421) (← links)
- Exponential ergodicity for SDEs under the total variation (Q1991701) (← links)
- Exponential mixing under controllability conditions for \textsc{sde}s driven by a degenerate Poisson noise (Q2029762) (← links)
- Controllability implies mixing. II: Convergence in the dual-Lipschitz metric (Q2031671) (← links)
- Ergodicity and exponential mixing of the real Ginzburg-Landau equation with a degenerate noise (Q2180594) (← links)
- Exponential mixing of 2D SDEs forced by degenerate Lévy noises (Q2249898) (← links)
- Exponential mixing for a class of dissipative PDEs with bounded degenerate noise (Q2309485) (← links)
- Exponential mixing for stochastic PDEs: the non-additive case (Q2464668) (← links)
- The Ginzburg-Landau Equations for Superconductivity with Random Fluctuations (Q3613592) (← links)
- On the rate of convergence as $ t\to+\infty$ of the distributions of solutions to the stationary measure for the stochastic system of the Lorenz model describing a baroclinic atmosphere (Q4596673) (← links)
- Kuzmin, coupling, cones, and exponential mixing (Q4661806) (← links)
- A coupling approach to randomly forced nonlinear PDE's. I (Q5953653) (← links)
- Exponential mixing for random dynamical systems and an example of Pierrehumbert (Q6116330) (← links)
- Exponential mixing for the white-forced complex Ginzburg-Landau equation in the whole space (Q6571354) (← links)
