Add to ORKGInternational audienceWe study the Cauchy problem for two systems of equations (Maxwell-Debye and Maxwell-Bloch) describing laser-matter interaction phenomena. We show that these problems are locally in time well-posed for initial data in different Sobolev spaces. In the case of Maxwell-Debye system, which contains some delay term, we study the limit of the solutions when this delay tends to 0. We also consider an adiabatic approximation of Maxwell-Bloch system
The optical Bloch equations, which give the time evolution of the elements of the density matrix of ...
We investigate some well-posedness issues for the initial value problem (IVP) associated to the syst...
Coupled wave equations are popular tool for investigating longitudinal dynamical effects in semicond...
International audienceIn this article we study the local-in-time Cauchy problem for the Schrödinger-...
Two nonlinear Maxwell systems are considered: Kerr model exhibiting an instantaneous response of the...
The types of integrable Maxwell-Bloch models appropriate to a wide class of nonlinear coherent optic...
International audienceWe present the Maxwell-Bloch equations that are a model for the semi-classical...
We derive a reduced model to describe two identical lasers coupled face to face. Two limits are intr...
The Maxwell–Bloch dissipative equations describe laser dynamics. Under a simple condition on the par...
This thesis consists into three parts addressing various aspects of the study of dispersive wave equ...
We derive from the classic Maxwell-Bloch equations a set of difference-differential equations valid,...
Abstract- The Euler-Maxwell system of equations is a complex, hydrodynamical model for the descripti...
Abstract. Analytical solutions for optical systems driven by exponential pulses are presen-ted. In p...
Herr S, Kato I, Kinoshita S, Spitz M. Local well-posedness of a system describing laser-plasma inter...
Abstract: In this paper, new models are derived for laser propagation in a nonlinear medium. These m...
The optical Bloch equations, which give the time evolution of the elements of the density matrix of ...
We investigate some well-posedness issues for the initial value problem (IVP) associated to the syst...
Coupled wave equations are popular tool for investigating longitudinal dynamical effects in semicond...
International audienceIn this article we study the local-in-time Cauchy problem for the Schrödinger-...
Two nonlinear Maxwell systems are considered: Kerr model exhibiting an instantaneous response of the...
The types of integrable Maxwell-Bloch models appropriate to a wide class of nonlinear coherent optic...
International audienceWe present the Maxwell-Bloch equations that are a model for the semi-classical...
We derive a reduced model to describe two identical lasers coupled face to face. Two limits are intr...
The Maxwell–Bloch dissipative equations describe laser dynamics. Under a simple condition on the par...
This thesis consists into three parts addressing various aspects of the study of dispersive wave equ...
We derive from the classic Maxwell-Bloch equations a set of difference-differential equations valid,...
Abstract- The Euler-Maxwell system of equations is a complex, hydrodynamical model for the descripti...
Abstract. Analytical solutions for optical systems driven by exponential pulses are presen-ted. In p...
Herr S, Kato I, Kinoshita S, Spitz M. Local well-posedness of a system describing laser-plasma inter...
Abstract: In this paper, new models are derived for laser propagation in a nonlinear medium. These m...
The optical Bloch equations, which give the time evolution of the elements of the density matrix of ...
We investigate some well-posedness issues for the initial value problem (IVP) associated to the syst...
Coupled wave equations are popular tool for investigating longitudinal dynamical effects in semicond...