In this paper we give a short presentation of the quantum Levy-Khinchin formula and of the formulation of quantum continual measurements based on stochastic differential equations, matters which we had the pleasure to work on in collaboration with Prof. Holevo. Then we begin the study of various entropies and relative entropies, which seem to be promising quantities for measuring the information content of the continual measurement under consideration and for analysing its asymptotic behaviour.

Instrumental processes, entropies, information in quantum continual measurements / A. Barchielli, G. Lupieri. - In: QUANTUM INFORMATION & COMPUTATION. - ISSN 1533-7146. - 4:6-7(2004), pp. 437-449.

Instrumental processes, entropies, information in quantum continual measurements

G. Lupieri
Ultimo
2004

Abstract

In this paper we give a short presentation of the quantum Levy-Khinchin formula and of the formulation of quantum continual measurements based on stochastic differential equations, matters which we had the pleasure to work on in collaboration with Prof. Holevo. Then we begin the study of various entropies and relative entropies, which seem to be promising quantities for measuring the information content of the continual measurement under consideration and for analysing its asymptotic behaviour.
differential equations ; entropy ; measurement theory ; quantum computing ; quantum theory ; stochastic processes
Settore FIS/02 - Fisica Teorica, Modelli e Metodi Matematici
2004
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2434/30915
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