Stability of quantum Markov systems is investigated in terms of stability of invariant states. Evolutions of a quantum system in the Heisenberg picture are considered which are modeled in terms of a quantum stochastic differential equation. Using a Markov operator semigroup associated with this quantum stochastic differential equation, we derive sufficient conditions for the existence and stability of a unique and faithful invariant quantum state. The conditions are formulated in terms of algebraic constraints suitable for engineering quantum systems to be used in coherent feedback networks. To derive these conditions, we use quantum analogues of the stochastic Lyapunov stability theory
This paper aims at discussing methods and results of Lyapunov stability theory for dynamical systems...
International audienceThis work treats the problem of generating any desired goal propagator for a d...
We consider finite-dimensional Markovian open quantum systems, and characterize the extent to which ...
Stability of quantum Markov systems is investigated in terms of stability of invariant states. Evolu...
Stability of quantum Markov systems is investigated in terms of stability of invariant states. Evolu...
Quantum Markovian systems, modeled as unitary dilations in the quantum stochastic calculus of Hudso...
We characterize the dynamical behavior of continuous-time, Markovian quantum systems with respect to...
Control by dissipation, or environment engineering, constitutes an important class of quantum cohere...
International audienceWe study the stability of quantum pure states and, more generally, subspaces f...
We propose a general theoretical framework that is suitable to study a wide class of stabilization p...
We consider a class of pure-state preparation problems for stochastic quantum dynamics, by means of ...
We propose a general framework for investigating a large class of stabilization problems in Markovia...
This thesis is concerned with robust performance analysis and coherent quantum control design for li...
We investigate some particular completely positive maps which admit a stable commutative Von Neumann...
When are quantum filters asymptotically independent of the initial state? We show that this is the c...
This paper aims at discussing methods and results of Lyapunov stability theory for dynamical systems...
International audienceThis work treats the problem of generating any desired goal propagator for a d...
We consider finite-dimensional Markovian open quantum systems, and characterize the extent to which ...
Stability of quantum Markov systems is investigated in terms of stability of invariant states. Evolu...
Stability of quantum Markov systems is investigated in terms of stability of invariant states. Evolu...
Quantum Markovian systems, modeled as unitary dilations in the quantum stochastic calculus of Hudso...
We characterize the dynamical behavior of continuous-time, Markovian quantum systems with respect to...
Control by dissipation, or environment engineering, constitutes an important class of quantum cohere...
International audienceWe study the stability of quantum pure states and, more generally, subspaces f...
We propose a general theoretical framework that is suitable to study a wide class of stabilization p...
We consider a class of pure-state preparation problems for stochastic quantum dynamics, by means of ...
We propose a general framework for investigating a large class of stabilization problems in Markovia...
This thesis is concerned with robust performance analysis and coherent quantum control design for li...
We investigate some particular completely positive maps which admit a stable commutative Von Neumann...
When are quantum filters asymptotically independent of the initial state? We show that this is the c...
This paper aims at discussing methods and results of Lyapunov stability theory for dynamical systems...
International audienceThis work treats the problem of generating any desired goal propagator for a d...
We consider finite-dimensional Markovian open quantum systems, and characterize the extent to which ...