Quantum stochastic calculus, operation valued stochastic processes, and continual measurements in quantum mechanics
- 1 September 1985
- journal article
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 26 (9) , 2222-2230
- https://doi.org/10.1063/1.526851
Abstract
The physical idea of a continual observation on a quantum system has been recently formalized by means of the concept of operation valued stochastic process (OVSP). In this article, it is shown how the formalism of quantum stochastic calculus of Hudson and Parthasarathy allows, in a simple way, for constructing a large class of OVSP’s that in particular contains the quantum counting processes of Davies and Srinivas and continual ‘‘Gaussian’’ measurements. This result is obtained by means of a stochastic dilation of the OVSP’s: at the level of the enlarged system probabilities turn out to be expressed in terms of projection valued measures associated with certain time‐dependent, commuting, self‐adjoint operators.Keywords
This publication has 17 references indexed in Scilit:
- Generalized stochastic processes and continual observations in quantum mechanicsJournal of Mathematical Physics, 1983
- Statistics of continuous trajectories in quantum mechanics: Operation-valued stochastic processesFoundations of Physics, 1983
- Continual measurements for quantum open systemsIl Nuovo Cimento B (1971-1996), 1983
- A model for the macroscopic description and continual observations in quantum mechanicsIl Nuovo Cimento B (1971-1996), 1982
- Photon Counting Probabilities in Quantum OpticsOptica Acta: International Journal of Optics, 1981
- Quantum counting processesJournal of Mathematical Physics, 1977
- Quantum communication systems (Corresp.)IEEE Transactions on Information Theory, 1977
- Quantum stochastic processes IIICommunications in Mathematical Physics, 1971
- Quantum stochastic processes IICommunications in Mathematical Physics, 1970
- Quantum stochastic processesCommunications in Mathematical Physics, 1969