Aller au contenu  Aller au menu  Aller à la recherche

Bienvenue - Laboratoire Jacques-Louis Lions

Partenariats

CNRS

UPMC

UdP
Print this page |
Internships (10th and 11th grades high school students)
Job shadowing (Year 10, Year 11 students) See https://www.math.univ-paris-diderot.fr/diffusion/index

Key figures

Key figures

189 people work at LJLL

90 permanent staff

82 researchers and permanent lecturers

8 engineers, technicians and administrative staff

99 non-permanent staff

73 Phd students

14 Post-doc and ATER

12 emeritus scholars and external collaborators

 

Figures : March 2019

 

Antonio De Rosa

Lundi 28 mai 2018

Antonio De Rosa (Courant Institute NY)

Anisotropic counterpart of Allard’s rectifiability theorem and applications.

Résumé :
We present our recent extension of Allard’s celebrated rectifiability theorem to the setting of varifolds with locally bounded first variation with respect to an anisotropic integrand. In particular, we identify a necessary and sufficient condition on the integrand to obtain the rectifiability of every d-dimensional varifold with locally bounded first variation and positive d-dimensional density.

We can apply this result to the minimization of anisotropic energies among families of d-rectifiable closed subsets of $\mathbbR^n$. Corollaries of this compactness result are the solutions to three formulations of the Plateau problem : one introduced by Reifenberg, one proposed by Harrison and Pugh and another one studied by Guy David.

Moreover, we apply the rectifiability theorem to prove an anisotropic counterpart of Allard’s compactness result for integral varifolds.

To conclude, we give some ideas of an ongoing project, which relies on the presented rectifiability theorem.

The main result is a joint work with G. De Philippis and F. Ghiraldin.