Add to ORKGAn algebraic decay rate is derived which bounds the time required for velocities to equilibrate in a spatially homogeneous flowthrough model representing the continuum limit of a gas of particles interacting through slightly inelastic collisions. This rate is obtained by reformulating the dynamical problem as the gradient flow of a convex energy on an infinite-dimensional manifold. An abstract theory is developed for gradient flows in length spaces, which shows how degenerate convexity (or even non-convexity) - if uniformly controlled - will quantify contractivity (limit expansivity) of the flow
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle sy...
The defining equation $(\ast):\ \dot \omega_t=-F'(\omega_t),$ of a gradient flow is kinetic in esse...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite e>0, the...
An algebraic decay rate is derived which bounds the time required for velocities to equilibrate in a...
Abstract. An algebraic decay rate is derived which bounds the time required for velocities to equili...
We establish an algebraic contraction rate in a modified Wasserstein distance for solutions of scala...
In this paper we establish a rigorous gradient flow structure for one-dimensional Kimura equations w...
Many evolutionary partial differential equations may be rewritten as the gradient flow of an energy ...
The long-time asymptotics of certain nonlinear , nonlocal, diffusive equations with a gradient flow ...
International audienceWe study the long time asymptotics of a nonlinear, nonlocal equation used in t...
Gradient flows of energy functionals on the space of probability measures with Wasserstein metric ha...
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle system on on...
This thesis introduces a variational formulation for a family of kinetic reaction-diffusion and thei...
The present notes are intended to present a detailed review of the existing results in dissipative k...
We present a probabilistic analysis of the long-time behaviour of the nonlocal, diffusive equations ...
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle sy...
The defining equation $(\ast):\ \dot \omega_t=-F'(\omega_t),$ of a gradient flow is kinetic in esse...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite e>0, the...
An algebraic decay rate is derived which bounds the time required for velocities to equilibrate in a...
Abstract. An algebraic decay rate is derived which bounds the time required for velocities to equili...
We establish an algebraic contraction rate in a modified Wasserstein distance for solutions of scala...
In this paper we establish a rigorous gradient flow structure for one-dimensional Kimura equations w...
Many evolutionary partial differential equations may be rewritten as the gradient flow of an energy ...
The long-time asymptotics of certain nonlinear , nonlocal, diffusive equations with a gradient flow ...
International audienceWe study the long time asymptotics of a nonlinear, nonlocal equation used in t...
Gradient flows of energy functionals on the space of probability measures with Wasserstein metric ha...
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle system on on...
This thesis introduces a variational formulation for a family of kinetic reaction-diffusion and thei...
The present notes are intended to present a detailed review of the existing results in dissipative k...
We present a probabilistic analysis of the long-time behaviour of the nonlocal, diffusive equations ...
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle sy...
The defining equation $(\ast):\ \dot \omega_t=-F'(\omega_t),$ of a gradient flow is kinetic in esse...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite e>0, the...