Add to ORKGAbstract. We demonstrate a method for obtaining strong solutions to the right Hudson-Parthasarathy quantum stochastic differential equation dUt = F α β Ut d
We study the existence and uniqueness of solution of the Kurzweil equations ~ with the Non-Lipschitz...
By using F. A. Berezin's canonical transformation method [5], we derive a nonadapted quantum stochas...
We consider the quantum stochastic differential equation introduced by Hudson and Parthasarathy to d...
AbstractWe demonstrate a method for obtaining strong solutions to the right Hudson–Parthasarathy qua...
Abstract. We introduce the concept of a mild solution for the right Hudson-Parthasarathy quantum sto...
Quantum stochastic dierential equation, stochastic dierential equation, mild solution We introduce t...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
We introduce the concept of a mild solution of Lipschitzian quantum stochastic differential equation...
Abstract. Quantum stochastic differential equations of the form dkt = kt ◦ θαβ dΛβα(t) govern stocha...
AbstractWe demonstrate a method for obtaining strong solutions to the right Hudson–Parthasarathy qua...
We introduce the concept of a mild solution of Lipschitzian quan-tum stochastic di_erential equation...
We study the existence and uniqueness of solution of the Kurzweil equations ~ with the Non-Lipschitz...
By using F. A. Berezin's canonical transformation method [5], we derive a nonadapted quantum stochas...
We consider the quantum stochastic differential equation introduced by Hudson and Parthasarathy to d...
AbstractWe demonstrate a method for obtaining strong solutions to the right Hudson–Parthasarathy qua...
Abstract. We introduce the concept of a mild solution for the right Hudson-Parthasarathy quantum sto...
Quantum stochastic dierential equation, stochastic dierential equation, mild solution We introduce t...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
A natural formulation of the theory of quantum measurements in continuous time is based on quantum s...
We introduce the concept of a mild solution of Lipschitzian quantum stochastic differential equation...
Abstract. Quantum stochastic differential equations of the form dkt = kt ◦ θαβ dΛβα(t) govern stocha...
AbstractWe demonstrate a method for obtaining strong solutions to the right Hudson–Parthasarathy qua...
We introduce the concept of a mild solution of Lipschitzian quan-tum stochastic di_erential equation...
We study the existence and uniqueness of solution of the Kurzweil equations ~ with the Non-Lipschitz...
By using F. A. Berezin's canonical transformation method [5], we derive a nonadapted quantum stochas...
We consider the quantum stochastic differential equation introduced by Hudson and Parthasarathy to d...