International audienceMany nonlinear partial differential equations (PDEs) display a coarsening dynamics, i.e., an emerging pattern whose typical length scale L increases with time. The so-called coarsening exponent n characterizes the time dependence of the scale of the pattern, L(t)≈tn, and coarsening dynamics can be described by a diffusion equation for the phase of the pattern. By means of a multiscale analysis we are able to find the analytical expression of such diffusion equations. Here, we propose a recipe to implement numerically the determination of D(λ), the phase diffusion coefficient, as a function of the wavelength λ of the base steady state u0(x). D carries all information about coarsening dynamics and, through the relation |...
We consider the coarsening dynamics of multiscale solutions to a dissipative singularly perturbed pa...
We investigate the late coarsening stages of one dimensional adsorption processes with diffusional r...
Most methods for modelling dynamics posit just two time scales: a fast and a slow scale. But many ap...
Instabilities and pattern formation is the rule in nonequilibrium systems. Selection of a persistent...
We suggest that coarsening dynamics can be described in terms of a generalized random walk, with the...
We prove a weak upper bound on the coarsening rate of the discrete-in-space version of an ill-posed,...
Abstract. We consider two standard models of surface-energy-driven coarsening: a constant-mobility C...
We provide a qualitative description of microstructure formation and coarsening phenomena for the so...
In this thesis, we prove one-sided, universal bounds on coarsening rates for three models of phase t...
"We study coarsening phenomena observed in discrete, ill-posed diffusion equations that arise in a v...
We consider two standard models of surface-energy-driven coarsening: a constant-mobility Cahn-Hilli...
We characterize the coarsening dynamics associated with a convective Cahn-Hilliard equation (cCH) in...
We consider a model for phase separation in binary viscous liquids that allows for material transpor...
We characterize the coarsening dynamics associated with a convective Cahn-Hilliard equation (cCH) i...
When a system such as a binary liquid is cooled rapidly from a homogeneous phase into a two-phase r...
We consider the coarsening dynamics of multiscale solutions to a dissipative singularly perturbed pa...
We investigate the late coarsening stages of one dimensional adsorption processes with diffusional r...
Most methods for modelling dynamics posit just two time scales: a fast and a slow scale. But many ap...
Instabilities and pattern formation is the rule in nonequilibrium systems. Selection of a persistent...
We suggest that coarsening dynamics can be described in terms of a generalized random walk, with the...
We prove a weak upper bound on the coarsening rate of the discrete-in-space version of an ill-posed,...
Abstract. We consider two standard models of surface-energy-driven coarsening: a constant-mobility C...
We provide a qualitative description of microstructure formation and coarsening phenomena for the so...
In this thesis, we prove one-sided, universal bounds on coarsening rates for three models of phase t...
"We study coarsening phenomena observed in discrete, ill-posed diffusion equations that arise in a v...
We consider two standard models of surface-energy-driven coarsening: a constant-mobility Cahn-Hilli...
We characterize the coarsening dynamics associated with a convective Cahn-Hilliard equation (cCH) in...
We consider a model for phase separation in binary viscous liquids that allows for material transpor...
We characterize the coarsening dynamics associated with a convective Cahn-Hilliard equation (cCH) i...
When a system such as a binary liquid is cooled rapidly from a homogeneous phase into a two-phase r...
We consider the coarsening dynamics of multiscale solutions to a dissipative singularly perturbed pa...
We investigate the late coarsening stages of one dimensional adsorption processes with diffusional r...
Most methods for modelling dynamics posit just two time scales: a fast and a slow scale. But many ap...