Add to ORKGWe study the Langevin dynamics corresponding to the $\nabla\phi$ (or Ginzburg-Landau) interface model with a uniformly convex interaction potential. We interpret these Langevin dynamics as a nonlinear parabolic equation forced by white noise, which turns the problem into a nonlinear homogenization problem. Using quantitative homogenization methods, we prove a quantitative hydrodynamic limit, obtain the $C^2$ regularity of the surface tension, prove a large-scale Lipschitz-type estimate for the trajectories of the dynamics, and show that the fluctuation-dissipation relation can be seen as a commutativity of homogenization and linearization. Finally, we explain why we believe our techniques can be adapted to the setting of degenerate (non-uni...
When the motion of a probe strongly disturbs the thermal equilibrium of the solvent or bath, the non...
We derive a continuum mean-curvature flow as a certain hydrodynamic scaling limit of Glauber-Kawasak...
Interfaces are created to separate two distinct phases in a situation in which phase coexistence occ...
We consider the ∇ϕ interface model with a uniformly convex interaction potential possessing Hölder c...
This thesis details recent results on the periodic homogenization of interface motions in the parabo...
Recently the study of gradient fields has attained a lot of attention because they are space-time an...
Abstract. Hydrodynamic limit for the Ginzburg-Landau ∇φ in-terface model was established in [5] unde...
AbstractThere has been considerable interest lately in the homogenization theory for first- and seco...
60 pages, 6 figuresInternational audienceFor a class of interacting particle systems in continuous s...
We discuss the dynamics of binary fluid mixtures in which surface tension density is allowed to beco...
Formally, we consider the continuum field of conserved quantities U(r, t) = ρj e ∼ = Ũ(r, t) =...
We report on a linear Langevin model that describes the evolution of the roughness of two interfaces...
38 pages, 6 figuresInternational audienceWe study a $(2+1)$-dimensional stochastic interface growth ...
International audienceWe present results on the ballistic and diffusive behavior of the Langevin dyn...
Characterization of composite materials, whose properties vary in space over microscopic scales, has...
When the motion of a probe strongly disturbs the thermal equilibrium of the solvent or bath, the non...
We derive a continuum mean-curvature flow as a certain hydrodynamic scaling limit of Glauber-Kawasak...
Interfaces are created to separate two distinct phases in a situation in which phase coexistence occ...
We consider the ∇ϕ interface model with a uniformly convex interaction potential possessing Hölder c...
This thesis details recent results on the periodic homogenization of interface motions in the parabo...
Recently the study of gradient fields has attained a lot of attention because they are space-time an...
Abstract. Hydrodynamic limit for the Ginzburg-Landau ∇φ in-terface model was established in [5] unde...
AbstractThere has been considerable interest lately in the homogenization theory for first- and seco...
60 pages, 6 figuresInternational audienceFor a class of interacting particle systems in continuous s...
We discuss the dynamics of binary fluid mixtures in which surface tension density is allowed to beco...
Formally, we consider the continuum field of conserved quantities U(r, t) = ρj e ∼ = Ũ(r, t) =...
We report on a linear Langevin model that describes the evolution of the roughness of two interfaces...
38 pages, 6 figuresInternational audienceWe study a $(2+1)$-dimensional stochastic interface growth ...
International audienceWe present results on the ballistic and diffusive behavior of the Langevin dyn...
Characterization of composite materials, whose properties vary in space over microscopic scales, has...
When the motion of a probe strongly disturbs the thermal equilibrium of the solvent or bath, the non...
We derive a continuum mean-curvature flow as a certain hydrodynamic scaling limit of Glauber-Kawasak...
Interfaces are created to separate two distinct phases in a situation in which phase coexistence occ...