International audienceWe investigate gradient flows of some homogeneous functionals in R^N , arising in the Lagrangian approximation of systems of self-interacting and diffusing particles. We focus on the case of negative homogeneity. In the case of strong self-interaction, the functional possesses a cone of negative energy. It is immediate to see that solutions with negative energy at some time become singular in finite time, meaning that a subset of particles concentrate at a single point. Here, we establish that all solutions become singular in finite time for the class of functionals under consideration. The paper is completed with numerical simulations illustrating the striking non linear dynamics when initial data have positive energy
44 pages, 2 figuresThis paper is devoted to the analysis of the classical Keller-Segel system over $...
In this note we study the singular vanishing-viscosity limit of a gradient flow set in a finite-dime...
We consider a general linear reaction-diffusion system in three dimensions and time, containing diff...
International audienceWe investigate gradient flows of some homogeneous functionals in R^N , arising...
peer reviewedWe investigate gradient flows of some homogeneous functionals in R N , arising in the L...
International audienceWe investigate a particle system which is a discrete and deterministic approxi...
These notes are dedicated to recent global existence and regularity results on the parabolic-ellipti...
We consider an aggregation-diffusion equation modelling particle interaction with non-linear diffusi...
We consider macroscopic descriptions of particles where repulsion is modelled by non-linear power-la...
We consider an aggregation-diffusion equation modelling particle interaction with non-linear diffusi...
Pré-tirageFor a specific choice of the diffusion, the parabolic-elliptic Patlak-Keller-Segel system ...
We consider a non-negative and one-homogeneous energy functional $mathcal J$ on a Hilbert space. The...
In this work, we show that a family of non-linear mean-field equations on discrete spaces, can be vi...
We develop a first- and second-order finite-volume scheme to solve gradient flow equations with non-...
44 pages, 2 figuresThis paper is devoted to the analysis of the classical Keller-Segel system over $...
In this note we study the singular vanishing-viscosity limit of a gradient flow set in a finite-dime...
We consider a general linear reaction-diffusion system in three dimensions and time, containing diff...
International audienceWe investigate gradient flows of some homogeneous functionals in R^N , arising...
peer reviewedWe investigate gradient flows of some homogeneous functionals in R N , arising in the L...
International audienceWe investigate a particle system which is a discrete and deterministic approxi...
These notes are dedicated to recent global existence and regularity results on the parabolic-ellipti...
We consider an aggregation-diffusion equation modelling particle interaction with non-linear diffusi...
We consider macroscopic descriptions of particles where repulsion is modelled by non-linear power-la...
We consider an aggregation-diffusion equation modelling particle interaction with non-linear diffusi...
Pré-tirageFor a specific choice of the diffusion, the parabolic-elliptic Patlak-Keller-Segel system ...
We consider a non-negative and one-homogeneous energy functional $mathcal J$ on a Hilbert space. The...
In this work, we show that a family of non-linear mean-field equations on discrete spaces, can be vi...
We develop a first- and second-order finite-volume scheme to solve gradient flow equations with non-...
44 pages, 2 figuresThis paper is devoted to the analysis of the classical Keller-Segel system over $...
In this note we study the singular vanishing-viscosity limit of a gradient flow set in a finite-dime...
We consider a general linear reaction-diffusion system in three dimensions and time, containing diff...