Add to ORKGInternational audienceWe prove existence of minimizing movements for the dislocation dynamics evolution law of a propagating front, in which the normal velocity of the front is the sum of a non-local term and a mean curvature term. We prove that any such minimizing movement is a weak solution of this evolution law, in a sense related to viscosity solutions of the corresponding level-set equation. We also prove the consistency of this approach, by showing that any minimizing movement coincides with the smooth evolution as long as the latter exists. In relation with this, we finally prove short time existence and uniqueness of a smooth front evolving according to our law, provided the initial shape is smooth enough
International audienceWe describe recent results obtained by G. Barles, P. Cardaliaguet, R. Monneau ...
The gradient flow structure of the model introduced in [CG99] for the dynamics of screw dislocations...
AbstractIn this paper we study the front propagation with constant speed and small curvature viscosi...
International audienceWe prove existence of minimizing movements for the dislocation dynamics evolut...
International audienceIn this paper we prove the convergence at a large scale of a non-local first o...
30 pages GNAMPA and the ERC grant 207573We address in this paper the study of a geometric evolution ...
International audienceThis paper aims at building a unified framework to deal with a wide class of l...
In this paper we study the front propagation with constant speed and small curvature viscosity. We f...
International audienceWe describe a method to show short time uniqueness results for viscosity solut...
In this paper we address anisotropic and inhomogeneous mean curvature flows with forcing and mobilit...
In this article, we consider hypersurfaces moving with normal velocity depending on the time-space c...
18 pagesWe consider the evolution of fronts by mean curvature in the presence of obstacles. We const...
We introduce a level-set formulation for the mean curvature flow with obstacles and show existence a...
This new version contains new results: we prove that the weak (viscosity) solutions of the Cauchy pr...
The gradient flow structure of the model introduced in Cermelli & Gurtin (1999, The motion of screw ...
International audienceWe describe recent results obtained by G. Barles, P. Cardaliaguet, R. Monneau ...
The gradient flow structure of the model introduced in [CG99] for the dynamics of screw dislocations...
AbstractIn this paper we study the front propagation with constant speed and small curvature viscosi...
International audienceWe prove existence of minimizing movements for the dislocation dynamics evolut...
International audienceIn this paper we prove the convergence at a large scale of a non-local first o...
30 pages GNAMPA and the ERC grant 207573We address in this paper the study of a geometric evolution ...
International audienceThis paper aims at building a unified framework to deal with a wide class of l...
In this paper we study the front propagation with constant speed and small curvature viscosity. We f...
International audienceWe describe a method to show short time uniqueness results for viscosity solut...
In this paper we address anisotropic and inhomogeneous mean curvature flows with forcing and mobilit...
In this article, we consider hypersurfaces moving with normal velocity depending on the time-space c...
18 pagesWe consider the evolution of fronts by mean curvature in the presence of obstacles. We const...
We introduce a level-set formulation for the mean curvature flow with obstacles and show existence a...
This new version contains new results: we prove that the weak (viscosity) solutions of the Cauchy pr...
The gradient flow structure of the model introduced in Cermelli & Gurtin (1999, The motion of screw ...
International audienceWe describe recent results obtained by G. Barles, P. Cardaliaguet, R. Monneau ...
The gradient flow structure of the model introduced in [CG99] for the dynamics of screw dislocations...
AbstractIn this paper we study the front propagation with constant speed and small curvature viscosi...