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On the quantum theory of sequential measurements

On the quantum theory of sequential measurements

JournalFoundations of Physics
PublisherSpringer Netherlands
ISSN0015-9018 (Print) 1572-9516 (Online)
IssueVolume 20, Number 7 / July, 1990
CategoryPart III. Invited Papers Dedicated To The Memory of Charles H. Randall (1928–1987)
DOI10.1007/BF01889690
Pages757-775
Subject CollectionPhysics and Astronomy
SpringerLink DateFriday, July 08, 2005
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Part III. Invited Papers Dedicated To The Memory of Charles H. Randall (1928–1987)

On the quantum theory of sequential measurements

Paul Busch1, Gianni Cassinelli2 and Pekka J. Lahti2, 3

(1) Institute for Theoretical Physics, University of Cologne, Zülpicher Strasse 77, D-5000 Cologne 41, West-Germany
(2) Dipartimento di Fisica, Università di Genova, I.N.F.N. Sezione di Genova, Via Dodecaneso 33, C.A.P. 16146 Genova, Italy
(3) Present address: Department of Physical Sciences, University of Turku, Turku, Finland

Received: 30 November 1989  

Abstract  The quantum theory of sequential measurements is worked out and is employed to provide an operational analysis of basic measurement theoretical notions such as coexistence, correlations, repeatability, and ideality. The problem of the operational definition of continuous observables is briefly revisited, with a special emphasis on the localization observable. Finally, a brief overview is given of possible applications of the theory to various fields and problems in quantum physics.
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Referenced by
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  1. Lahti, Pekka (2009) On the Complementarity of the Quadrature Observables. Foundations of Physics
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  2. Lahti, Pekka J. (1991) Some important classes of quantum measurements and their information gain. Journal of Mathematical Physics 32(10)
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  3. Sl̸omczyński, Wojciech (1994) Quantum chaos: An entropy approach. Journal of Mathematical Physics 35(11)
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  4. Carmeli, Claudio (2007) Intrinsic unsharpness and approximate repeatability of quantum measurements. Journal of Physics A Mathematical and Theoretical 40(6)
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  5. Busch, Paul (1995) Repeatable measurements in quantum theory: Their role and feasibility. Foundations of Physics 25(9)
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  6. Anastopoulos, Charis (2006) Classical Versus Quantum Probability in Sequential Measurements. Foundations of Physics 36(11)
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  7. Cassinelli, G. (1994) Geometric phase and sequential measurements in quantum mechanics. Physical Review A 49(5)
    [CrossRef]
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