Add to ORKGInternational audienceThis paper is composed of two parts. In the frst part, via a reduction dimension method, we derive a one-dimensional minimization problem involving S^2 valued maps for a thin T-shaped multidomain. In the second one, we analyze this limit model
AbstractOur main result is a limit shape theorem for the two-dimensional surface defined by a unifor...
3D-1D dimension reduction is deduced, via λ-convergence, for a nonlinear optimal design problem with...
We consider area minimizing m-dimensional currents mod(p) in complete C^2 Riemannian manifolds $Sigm...
This paper is composed of two parts. In the first part, via a reduction dimension method, we derive ...
International audienceWe consider a thin multidomain of R^3 consisting of two vertical cylinders, on...
International audienceWe consider a thin multidomain of R(3) consisting of two vertical cylinders, o...
Abstract. Our main result is a limit shape theorem for the two-dimensional surface de ned by a unifo...
In this paper, we propose numerical methods for minimization problems constrained to S 1 and S 2. By...
The Multidimensional Assignment Problem (MAP) is an NP-hard combinatorial optimization problem occur...
This note is a survey on the optimal regularity theory for 2-dimensional area minimizing surfaces in...
A 3D-2D dimension reduction is deduced, via Gamma convergence, for a nonlinear optimal design proble...
We consider the problem of the optimal location of a Dirichlet region in a two-dimensional domain [\...
Abstract: Optimal transportation plays an important role in many engineering fields, especially in d...
In this paper we show the surprising results that while the local reach of the boundary of an L1TV m...
AbstractIn this paper, a new minimization theorem is obtained for a set-valued mapping and an equiva...
AbstractOur main result is a limit shape theorem for the two-dimensional surface defined by a unifor...
3D-1D dimension reduction is deduced, via λ-convergence, for a nonlinear optimal design problem with...
We consider area minimizing m-dimensional currents mod(p) in complete C^2 Riemannian manifolds $Sigm...
This paper is composed of two parts. In the first part, via a reduction dimension method, we derive ...
International audienceWe consider a thin multidomain of R^3 consisting of two vertical cylinders, on...
International audienceWe consider a thin multidomain of R(3) consisting of two vertical cylinders, o...
Abstract. Our main result is a limit shape theorem for the two-dimensional surface de ned by a unifo...
In this paper, we propose numerical methods for minimization problems constrained to S 1 and S 2. By...
The Multidimensional Assignment Problem (MAP) is an NP-hard combinatorial optimization problem occur...
This note is a survey on the optimal regularity theory for 2-dimensional area minimizing surfaces in...
A 3D-2D dimension reduction is deduced, via Gamma convergence, for a nonlinear optimal design proble...
We consider the problem of the optimal location of a Dirichlet region in a two-dimensional domain [\...
Abstract: Optimal transportation plays an important role in many engineering fields, especially in d...
In this paper we show the surprising results that while the local reach of the boundary of an L1TV m...
AbstractIn this paper, a new minimization theorem is obtained for a set-valued mapping and an equiva...
AbstractOur main result is a limit shape theorem for the two-dimensional surface defined by a unifor...
3D-1D dimension reduction is deduced, via λ-convergence, for a nonlinear optimal design problem with...
We consider area minimizing m-dimensional currents mod(p) in complete C^2 Riemannian manifolds $Sigm...