A Lyapunov-based approach for the trajectory generation of an N-dimensional Schrödinger equation in whole RN is proposed. For the case of a quantum particle in an N-dimensional decaying potential the convergence is precisely analyzed. The free system admitting a mixed spectrum, the dispersion through the absolutely continuous part is the main obstacle to ensure such a stabilization result. Whenever, the system is completely initialized in the discrete part of the spectrum, a Lyapunov strategy encoding both the distance with respect to the target state and the penalization of the passage through the continuous part of the spectrum, ensures the approximate stabilization
Control in quantum systems is proving to be one of the top challenges in the computing world as scal...
International audienceWe study the state feedback stabilization of a quantum harmonic oscillator nea...
In the closed quantum system, if the control system is strongly regular and all other eigenstates ar...
Abstract: The convergence of a Lyapounov based control of the Schrödinger equation (finite dimension...
International audienceAn implicit Lyapunov-based approach is proposed for generating trajectories of...
A Lyapunov-based approach for trajectory tracking of the Schrödinger equation is proposed. In the fi...
An implicit Lyapunov based approach is proposed for generating trajectories of a finite dimensional ...
We investigate the Lyapunov control of finite-dimensional quantum systems with impulsive control fie...
In this paper we analyze the Lyapunov trajectory tracking of the Schrödinger equation for a coupling...
We analyze in this paper finite dimensional closed quantum systems in interaction with a laser field. ...
The condition of a quantum Lyapunov-based control which can be well used in a closed quantum system ...
International audienceThis work treats the problem of generating any desired goal propagator for a d...
We analyse in this paper the Lyapunov trajectory tracking of the Schrödinger equation for a second o...
Closed quantum systems under the influence of a laser field, whose interaction is modeled by a Schrödi...
We introduce two models of controlled infinite dimensional quantum system whose Hamiltonian operator...
Control in quantum systems is proving to be one of the top challenges in the computing world as scal...
International audienceWe study the state feedback stabilization of a quantum harmonic oscillator nea...
In the closed quantum system, if the control system is strongly regular and all other eigenstates ar...
Abstract: The convergence of a Lyapounov based control of the Schrödinger equation (finite dimension...
International audienceAn implicit Lyapunov-based approach is proposed for generating trajectories of...
A Lyapunov-based approach for trajectory tracking of the Schrödinger equation is proposed. In the fi...
An implicit Lyapunov based approach is proposed for generating trajectories of a finite dimensional ...
We investigate the Lyapunov control of finite-dimensional quantum systems with impulsive control fie...
In this paper we analyze the Lyapunov trajectory tracking of the Schrödinger equation for a coupling...
We analyze in this paper finite dimensional closed quantum systems in interaction with a laser field. ...
The condition of a quantum Lyapunov-based control which can be well used in a closed quantum system ...
International audienceThis work treats the problem of generating any desired goal propagator for a d...
We analyse in this paper the Lyapunov trajectory tracking of the Schrödinger equation for a second o...
Closed quantum systems under the influence of a laser field, whose interaction is modeled by a Schrödi...
We introduce two models of controlled infinite dimensional quantum system whose Hamiltonian operator...
Control in quantum systems is proving to be one of the top challenges in the computing world as scal...
International audienceWe study the state feedback stabilization of a quantum harmonic oscillator nea...
In the closed quantum system, if the control system is strongly regular and all other eigenstates ar...