We consider singular perturbations of elliptic systems depending on a parameter ε such that, for ε = 0 the boundary conditions are not adapted to the equation (they do not satisfy the Shapiro - Lopatinskii condition). The limit holds only in very abstract spaces out of distribu- tion theory involving complexification and non-local phenomena. This system appears in the thin shell theory when the middle surface is el- liptic and the shell is fixed on a part of the boundary and free on the rest. We use a heuristic reasoning applying some simplifications which allow to reduce the original problem in a domain to another problem on its boundary. The novelty of this work is that we consider systems of partial differential equations while in our previo...
AbstractWe consider the singular perturbation problem (Dirichlet problem), ϵL1u + L0u ϵL1u + (∂∂x1...
AbstractWe establish an existence result for strongly indefinite semilinear elliptic systems with Ne...
AbstractIn this paper we are interested in establishing up-to boundary uniform estimates for the one...
We consider singular perturbations of elliptic systems depending on a parameter ε such that, for ε =...
We consider singular perturbation elliptic problems depending on a parameter ε such that, for ε = 0 ...
AbstractWe consider singular perturbated elliptic boundary value problems depending on a parameter ε...
We consider a class of singular perturbation elliptic boundary value problems depending on a paramet...
International audienceIn this work, we consider singular perturbations of the boundary of a smooth d...
Rapporteurs: Paolo Marcellini & L.A. Peletier Membres de Jury: Pierre Fabrie, Patrick Gerard, Daniel...
We consider an elliptic perturbation problem in a circle by using the analytical solution that is ...
AbstractWe study a singular perturbation problem for a system defined under a variational form. We s...
AbstractWe consider a singularly perturbed problem with mixed Dirichlet and Neumann boundary conditi...
We deal with singular perturbations of nonlinear problems depending on a small parameter ε > 0. Firs...
AbstractWe prove domain perturbation theorems for linear and nonlinear elliptic equations under Robi...
We study the effect of regular and singular domain perturbations on layer potential operators for th...
AbstractWe consider the singular perturbation problem (Dirichlet problem), ϵL1u + L0u ϵL1u + (∂∂x1...
AbstractWe establish an existence result for strongly indefinite semilinear elliptic systems with Ne...
AbstractIn this paper we are interested in establishing up-to boundary uniform estimates for the one...
We consider singular perturbations of elliptic systems depending on a parameter ε such that, for ε =...
We consider singular perturbation elliptic problems depending on a parameter ε such that, for ε = 0 ...
AbstractWe consider singular perturbated elliptic boundary value problems depending on a parameter ε...
We consider a class of singular perturbation elliptic boundary value problems depending on a paramet...
International audienceIn this work, we consider singular perturbations of the boundary of a smooth d...
Rapporteurs: Paolo Marcellini & L.A. Peletier Membres de Jury: Pierre Fabrie, Patrick Gerard, Daniel...
We consider an elliptic perturbation problem in a circle by using the analytical solution that is ...
AbstractWe study a singular perturbation problem for a system defined under a variational form. We s...
AbstractWe consider a singularly perturbed problem with mixed Dirichlet and Neumann boundary conditi...
We deal with singular perturbations of nonlinear problems depending on a small parameter ε > 0. Firs...
AbstractWe prove domain perturbation theorems for linear and nonlinear elliptic equations under Robi...
We study the effect of regular and singular domain perturbations on layer potential operators for th...
AbstractWe consider the singular perturbation problem (Dirichlet problem), ϵL1u + L0u ϵL1u + (∂∂x1...
AbstractWe establish an existence result for strongly indefinite semilinear elliptic systems with Ne...
AbstractIn this paper we are interested in establishing up-to boundary uniform estimates for the one...