Add to ORKGIn this paper, we study unitary Gaussian processes with independent increments with which the unitary equivalence to a Hudson-Parthasarathy evolution system is proved. This gives a generalization of results in [11] and [12] in the absence of the stationarity condition
A Trotter product formula is established for unitary quantum stochastic processes governed by quantu...
AbstractWe demonstrate a method for obtaining strong solutions to the right Hudson–Parthasarathy qua...
We prove the stochastic independence of the basic integrators of the renormalized square of white no...
The aim of this article is to characterize unitary increment process by a quantum stochastic integra...
This is a continuation of the earlier work (Publ. Res. Inst. Math. Sci. 45 (2009) 745-785) to charac...
The aim of this article is to characterize unitary increment process by a quantum stochastic integ...
AbstractWe give a complete characterization of a class of quantum stochastic processes with independ...
Two new approaches to the infinitesimal characterisation of quantum stochastic cocycles are reviewed...
We prove the It\^{o} multiplication table for the stochastic differentials of the universal envelopi...
Hudson-Parthasarathy (H-P) type quantum stochastic dilation of a class of C0 semigroups of completel...
AbstractExistence and uniqueness theorems for stochastic evolution equations are developed in a Hilb...
Stimulated by the quantum generalization of the canonical representation theory for Gaussian process...
Starting from the quantum stochastic differential equations of Hudson and Parthasarathy Commun. Math...
We consider the problem of controlling the size of an elementary quantum stochastic flow generated ...
AbstractA time-indexed family of ∗-homomorphisms between operator algebras (jt:A→B)t∈Iis called a st...
A Trotter product formula is established for unitary quantum stochastic processes governed by quantu...
AbstractWe demonstrate a method for obtaining strong solutions to the right Hudson–Parthasarathy qua...
We prove the stochastic independence of the basic integrators of the renormalized square of white no...
The aim of this article is to characterize unitary increment process by a quantum stochastic integra...
This is a continuation of the earlier work (Publ. Res. Inst. Math. Sci. 45 (2009) 745-785) to charac...
The aim of this article is to characterize unitary increment process by a quantum stochastic integ...
AbstractWe give a complete characterization of a class of quantum stochastic processes with independ...
Two new approaches to the infinitesimal characterisation of quantum stochastic cocycles are reviewed...
We prove the It\^{o} multiplication table for the stochastic differentials of the universal envelopi...
Hudson-Parthasarathy (H-P) type quantum stochastic dilation of a class of C0 semigroups of completel...
AbstractExistence and uniqueness theorems for stochastic evolution equations are developed in a Hilb...
Stimulated by the quantum generalization of the canonical representation theory for Gaussian process...
Starting from the quantum stochastic differential equations of Hudson and Parthasarathy Commun. Math...
We consider the problem of controlling the size of an elementary quantum stochastic flow generated ...
AbstractA time-indexed family of ∗-homomorphisms between operator algebras (jt:A→B)t∈Iis called a st...
A Trotter product formula is established for unitary quantum stochastic processes governed by quantu...
AbstractWe demonstrate a method for obtaining strong solutions to the right Hudson–Parthasarathy qua...
We prove the stochastic independence of the basic integrators of the renormalized square of white no...