2000
DOI: 10.1007/s004400050261
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Existence, positivity and contractivity for quantum stochastic flows with infinite dimensional noise

Abstract: Abstract. Quantum stochastic differential equations of the form dkt = kt • θ α β dΛ β α (t) govern stochastic flows on a C * -algebra A. We analyse this class of equation in which the matrix of fundamental quantum stochastic integrators Λ is infinite dimensional, and the coefficient matrix θ consists of bounded linear operators on A. Weak and strong forms of solution are distinguished, and a range of regularity conditions on the mapping matrix θ are considered, for investigating existence and uniqueness of sol… Show more

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Cited by 41 publications
(76 citation statements)
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“…( [Par], [LW1]). To achieve this continuous time stochastic Stinespring decomposition it may be necessary to enlarge the dimension of the quantum noise driving the given process k. Interest in completely positive stochastic flows and their structure comes from several sources.…”
Section: Introductionmentioning
confidence: 99%
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“…( [Par], [LW1]). To achieve this continuous time stochastic Stinespring decomposition it may be necessary to enlarge the dimension of the quantum noise driving the given process k. Interest in completely positive stochastic flows and their structure comes from several sources.…”
Section: Introductionmentioning
confidence: 99%
“…To achieve this continuous time stochastic Stinespring decomposition it may be necessary to enlarge the dimension of the quantum noise driving the given process k. Interest in completely positive stochastic flows and their structure comes from several sources. They arise naturally in the quantum theory of filtering ([Be1]); they will be required for any quantum theory of measure-valued diffusions ( [GLSW]); but also their study allows quantum dynamical semigroups ( [EvL]), quantum diffusions on an operator algebra ( [Hud], [Eva]), and contraction processes on a Hilbert space ( [Fag], [Moh]), to be viewed from a common vantage point ( [LiP], [LW1]). In a sister paper ( [GLSW]) completely positive Markovian contraction cocycles are dilated to * -homomorphic Markovian cocycles driven by a higher dimensional quantum noise, extending the dilation of quantum dynamical semigroups achieved in [GoS].…”
Section: Introductionmentioning
confidence: 99%
“…Let us prove that the germ-maps γ µ ν of a CP flow φ must be conditionally completely positive (CCP) in a degenerated sense as it was found for the finite-dimensional bounded case in [7,11]. Another, equivalent, but not so explicit characterization was suggested for this particular case in [12]. The proof is given in [9,10] even for the general (noncommutative) algebras a and A.…”
Section: Generators Of Quantum Cp Dynamicsmentioning
confidence: 88%
“…As was proven in [7,11] for the case of finite-dimensional matrix γ of bounded γ µ ν , see also [12], the matrix elements K − ν can be chosen in such way that the matrix map ϕ = (ϕ µ ν )…”
Section: Ifmentioning
confidence: 99%
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