We introduce an extended notion of mean curvature for graphs via the Euler-Lagrange equation of a geometric elliptic functional. We then draw some geometric conclusions for Killing graphs with prescribed weighted and anisotropic mean curvatures with the aid of a general form of the weak maximum principle and a sufficient condition for an appropriate notion of parabolicity
Abstract. We study graphical mean curvature flow of complete solutions de-fined on subsets of Euclid...
Abstract. We study graphical mean curvature flow of complete solutions de-fined on subsets of Euclid...
This work shows results existence and uniqueness of graphs with prescribed mean curvature. We demons...
In this paper, we propose an adaptation and transcrip-tion of the mean curvature level set equation ...
We study the mean curvature ow of graphs both with Neumann boundary conditions and transport terms....
International audienceIn this paper, we propose an adaptation and a transcription of the mean curvat...
International audienceIn this paper, we propose an adaptation and a transcription of the mean curvat...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
This survey describes some recent rigidity results obtained by the authors for the prescribed mean c...
We study some properties of graphs whose mean curvature (in distributional sense) is a vector Radon...
A geometric evolution equation is a partial differential equation that evolves some kind of geometri...
Abstract. We study graphical mean curvature flow of complete solutions de-fined on subsets of Euclid...
Abstract. We study graphical mean curvature flow of complete solutions de-fined on subsets of Euclid...
This work shows results existence and uniqueness of graphs with prescribed mean curvature. We demons...
In this paper, we propose an adaptation and transcrip-tion of the mean curvature level set equation ...
We study the mean curvature ow of graphs both with Neumann boundary conditions and transport terms....
International audienceIn this paper, we propose an adaptation and a transcription of the mean curvat...
International audienceIn this paper, we propose an adaptation and a transcription of the mean curvat...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
In this paper we characterize the Neumann-parabolicity of manifolds with boundary in terms of a new ...
This survey describes some recent rigidity results obtained by the authors for the prescribed mean c...
We study some properties of graphs whose mean curvature (in distributional sense) is a vector Radon...
A geometric evolution equation is a partial differential equation that evolves some kind of geometri...
Abstract. We study graphical mean curvature flow of complete solutions de-fined on subsets of Euclid...
Abstract. We study graphical mean curvature flow of complete solutions de-fined on subsets of Euclid...
This work shows results existence and uniqueness of graphs with prescribed mean curvature. We demons...
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