Some "classical" stochastic differential equations have been used in the theory of measurements continuous in time in quantum mechanics and, more generally, in quantum open system theory. In this paper, we introduce and study a class of such equations which allow us to achieve the same level of generality as the one obtained by the approach to continuous measurements based on semigroups of operators. To this aim, we have to study some linear and non-linear stochastic differential equations for processes in Hilbert spaces and in some related Banach spaces. By this stochastic approach we can also obtain new results on the evolution systems which substitute the semigroups of probability operators in the time inhomogeneous case.60H10 58D25 47D0...
Many results, both from semigroup theory itself and from the applied sciences, are phrased in discip...
The monograph is devoted mainly to the analytical study of the differential, pseudo-differential and...
This paper introduces several new classes of mathematical structures that have close connections wit...
AbstractSome “classical” stochastic differential equations have been used in the theory of measureme...
AbstractA class of linear stochastic differential equations in Hilbert spaces is studied, which allo...
A class of linear stochastic differential equations in Hilbert spaces is studied, which allows to co...
We study the Classical Probability analogue of the unitary dilations of a quantum dynamical semigr...
AbstractBasic results on stochastic differential equations in Hilbert and Banach space, linear stoch...
In this thesis new foundations for the stochastic process are formulated which lead to the conventio...
We study stochastic evolution equations describing the dynamics of open quantum systems. First, usi...
Basic results on stochastic differential equations in Hilbert and Banach space, linear stochastic ev...
AbstractA time-indexed family of ∗-homomorphisms between operator algebras (jt:A→B)t∈Iis called a st...
AbstractIn this paper linear stochastic integral evolution equations are studied. They are associate...
In this article we study the long time behaviour of a class of stochastic differential equations int...
The classical probability theory initiated by Kolmogorov and its quantum counterpart, pioneered by v...
Many results, both from semigroup theory itself and from the applied sciences, are phrased in discip...
The monograph is devoted mainly to the analytical study of the differential, pseudo-differential and...
This paper introduces several new classes of mathematical structures that have close connections wit...
AbstractSome “classical” stochastic differential equations have been used in the theory of measureme...
AbstractA class of linear stochastic differential equations in Hilbert spaces is studied, which allo...
A class of linear stochastic differential equations in Hilbert spaces is studied, which allows to co...
We study the Classical Probability analogue of the unitary dilations of a quantum dynamical semigr...
AbstractBasic results on stochastic differential equations in Hilbert and Banach space, linear stoch...
In this thesis new foundations for the stochastic process are formulated which lead to the conventio...
We study stochastic evolution equations describing the dynamics of open quantum systems. First, usi...
Basic results on stochastic differential equations in Hilbert and Banach space, linear stochastic ev...
AbstractA time-indexed family of ∗-homomorphisms between operator algebras (jt:A→B)t∈Iis called a st...
AbstractIn this paper linear stochastic integral evolution equations are studied. They are associate...
In this article we study the long time behaviour of a class of stochastic differential equations int...
The classical probability theory initiated by Kolmogorov and its quantum counterpart, pioneered by v...
Many results, both from semigroup theory itself and from the applied sciences, are phrased in discip...
The monograph is devoted mainly to the analytical study of the differential, pseudo-differential and...
This paper introduces several new classes of mathematical structures that have close connections wit...
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