Add to ORKGWe revisit the grazing collision limit connecting the Boltzmann equation to the Landau(-Fokker-Planck) equation from their recent reinterpretations as gradient flows. Our results are in the same spirit as the $\Gamma$-convergence of gradient flows technique introduced by Sandier and Serfaty. In this setting, the grazing collision limit reduces to showing the lower semi-continuous convergence of the Boltzmann entropy-dissipation to the Landau entropy-dissipation
We give an explicit bound for the Wasserstein distance with quadratic cost between the solutions of ...
I propose to study two different problems related to recent developments on kinetic theories. The fi...
We consider nonlinear reaction systems satisfying mass-action kinetics with slow and fast reactions....
This thesis provides and investigates the rigorous gradient flow viewpoint of the spatially homogene...
We review here some recent developments connected to the asymptotics of the spatially homoheneus Bol...
The Landau equation and the Boltzmann equation are connected through the limit of grazing collisions...
We propose a gradient flow perspective to the spatially homogeneous Landau equation for soft potenti...
Using probabilistic tools, this work states a pointwise convergence of function solutions of the 2-...
I present some results obtained together with D. Benedetto and L. Bertini on a gradient flow formula...
. We show that Boltzmann's collision operator can be written explicitly in divergence and doubl...
We examine a family of microscopic models of plasmas, with a parameter [\alpha] comparing the typica...
We consider a system of N particles interacting via a short-range smooth potential, in a intermediat...
The Lorentz operators are derived from either Boltzmann or Fokker–Planck collisions operators when c...
We solve the Cauchy problem associated to the space homogeneous Boltzmann equation with an angle-pot...
Abstract. We present new results building on the conservative deterministic spectral method for the ...
We give an explicit bound for the Wasserstein distance with quadratic cost between the solutions of ...
I propose to study two different problems related to recent developments on kinetic theories. The fi...
We consider nonlinear reaction systems satisfying mass-action kinetics with slow and fast reactions....
This thesis provides and investigates the rigorous gradient flow viewpoint of the spatially homogene...
We review here some recent developments connected to the asymptotics of the spatially homoheneus Bol...
The Landau equation and the Boltzmann equation are connected through the limit of grazing collisions...
We propose a gradient flow perspective to the spatially homogeneous Landau equation for soft potenti...
Using probabilistic tools, this work states a pointwise convergence of function solutions of the 2-...
I present some results obtained together with D. Benedetto and L. Bertini on a gradient flow formula...
. We show that Boltzmann's collision operator can be written explicitly in divergence and doubl...
We examine a family of microscopic models of plasmas, with a parameter [\alpha] comparing the typica...
We consider a system of N particles interacting via a short-range smooth potential, in a intermediat...
The Lorentz operators are derived from either Boltzmann or Fokker–Planck collisions operators when c...
We solve the Cauchy problem associated to the space homogeneous Boltzmann equation with an angle-pot...
Abstract. We present new results building on the conservative deterministic spectral method for the ...
We give an explicit bound for the Wasserstein distance with quadratic cost between the solutions of ...
I propose to study two different problems related to recent developments on kinetic theories. The fi...
We consider nonlinear reaction systems satisfying mass-action kinetics with slow and fast reactions....