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Dambrine, Marc - Laboratoire de Mathématiques et de leurs Applications, Université de Pau et des Pays de l'Adour
ccsd-00084598,version1-7Jul2006 A remark on precomposition on H1/2
hal-00140211,version1-5Apr2007 On second order shape optimization methods for electrical impedance
A multiscale correction method for local singular perturbations of the boundary
Effect of surface defects on structure failure: a two-scale approach
ESAIM: PROCEEDINGS, Vol. ?, 2011, 1-10 Editors: Will be set by the publisher
Detecting an obstacle immersed in a fluid by shape optimization methods
A Kohn-Vogelius formulation to detect an obstacle immersed in a fluid
ON THE WEAK MATERIAL APPROXIMATION IN LEVEL-SET MARC DAMBRINE AND DJALIL KATEB
On the shape sensitivity of the first Dirichlet eigenvalue for two-phase problems
On the necessity of Nitsche term. Part II: an alternative approach. J.P. Boufflet
On the necessity of Nitsche term , J.P. Boufflet
On generalized Ventcel's type boundary conditions for Laplace operator in a bounded domain.
theory of linear elasticity in the half-space Chrif Amrouche
Research Summary presented by Marc Dambrine
Persistency of wellposedness of Ventcel's boundary value problem under shape deformations
C. R. Acad. Sci. Paris, Ser. I 345 (2007) 609614 http://france.elsevier.com/direct/CRASS1/
Introduction to Shape Optimization Lectures at Copromath VII
Localisation of small obstacles in Stokes flow Fabien Caubet
theory of linear elasticity in the half-space Chrif Amrouche
A Kohn-Vogelius formulation to detect an obstacle immersed , M Dambrine
