International audienceThe dynamic Maxwell equations with a strictly dissipative boundary condition is considered. Sharp trace regularity for the electric and the magnetic field are established for both: weak and differ-entiable solutions. As an application a shape optimization problem for Maxwell's equations is considered. In order to characterize the shape derivative as a solution to a boundary value problem, the aforementioned sharp regularity of the boundary traces is critical
Shape optimization amounts to find the optimal shape of a domain which minimizes a given criterion, ...
Introduction The problem of accurate boundary treatments has long been an obstacle to the developme...
AbstractThe Boussinesq approximation to the Fourier–Navier–Stokes (F–N–S) flows under the electromag...
AbstractThe dynamic Maxwell equations with a strictly dissipative boundary condition is considered. ...
International audienceThe shape sensitivity analysis for hyperbolic problems yields some specific co...
Shape optimization problems of linear elastic continua, flow fields, magnetic fields, etc. under equ...
Abstract. In this paper we consider a model shape optimization problem. The state variable solves an...
We develop the shape derivative analysis of solutions to the problem of scattering of time-harmonic ...
The subject of this paper are Hs and Lp-regularity-results for the stationary and transient Maxwell-...
International audienceThis article deals with the optimization of the shape of the regions assigned ...
Spitz M. Regularity theory for nonautonomous Maxwell equations with perfectly conducting boundary co...
International audienceFor a transmission problem in a truncated two-dimensional cylinder located ben...
We prove the existence and uniqueness of weak solutions to the variational formulation of the Maxwel...
We prove regularity results up to the boundary for generalized Maxwell equa-tions on Riemannian mani...
Abstract: The non-reflecting boundary conditions for the Maxwell's equations with the comp...
Shape optimization amounts to find the optimal shape of a domain which minimizes a given criterion, ...
Introduction The problem of accurate boundary treatments has long been an obstacle to the developme...
AbstractThe Boussinesq approximation to the Fourier–Navier–Stokes (F–N–S) flows under the electromag...
AbstractThe dynamic Maxwell equations with a strictly dissipative boundary condition is considered. ...
International audienceThe shape sensitivity analysis for hyperbolic problems yields some specific co...
Shape optimization problems of linear elastic continua, flow fields, magnetic fields, etc. under equ...
Abstract. In this paper we consider a model shape optimization problem. The state variable solves an...
We develop the shape derivative analysis of solutions to the problem of scattering of time-harmonic ...
The subject of this paper are Hs and Lp-regularity-results for the stationary and transient Maxwell-...
International audienceThis article deals with the optimization of the shape of the regions assigned ...
Spitz M. Regularity theory for nonautonomous Maxwell equations with perfectly conducting boundary co...
International audienceFor a transmission problem in a truncated two-dimensional cylinder located ben...
We prove the existence and uniqueness of weak solutions to the variational formulation of the Maxwel...
We prove regularity results up to the boundary for generalized Maxwell equa-tions on Riemannian mani...
Abstract: The non-reflecting boundary conditions for the Maxwell's equations with the comp...
Shape optimization amounts to find the optimal shape of a domain which minimizes a given criterion, ...
Introduction The problem of accurate boundary treatments has long been an obstacle to the developme...
AbstractThe Boussinesq approximation to the Fourier–Navier–Stokes (F–N–S) flows under the electromag...