A new infinitesimal characterization of completely positive but not necessarily homomorphic Markov flows from a C*-algebra to bounded operators on the boson Fock space over L2(R) is given. Contrarily to previous characterizations, based on stochastic differential equations, this characterization is universal, i.e., valid for arbitrary Markov flows. With this result the study of Markov flows is reduced to the study of four C0-semigroups. This includes the classical case and even in this case it seems to be new. The result is applied to deduce a new existence theorem for Markov flows.
Accardi, L., Kozyrev, S.v. (2001). On the structure of Markov flows. CHAOS, SOLITONS AND FRACTALS, 12(14/15), 2639-2655 [10.1016/S0960-0779(01)00079-0].
On the structure of Markov flows
ACCARDI, LUIGI;
2001-01-01
Abstract
A new infinitesimal characterization of completely positive but not necessarily homomorphic Markov flows from a C*-algebra to bounded operators on the boson Fock space over L2(R) is given. Contrarily to previous characterizations, based on stochastic differential equations, this characterization is universal, i.e., valid for arbitrary Markov flows. With this result the study of Markov flows is reduced to the study of four C0-semigroups. This includes the classical case and even in this case it seems to be new. The result is applied to deduce a new existence theorem for Markov flows.File | Dimensione | Formato | |
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