Samuel L. Braunstein and Carlton M. Caves, "Geometry of quantum states," in Fundamental Problems in Quantum Theory: A Conference Held in Honor of John A. Wheeler, D. M. Greenberger and A. Zeilinger, Eds., New York, 1995, vol. 755 of Annals of the New York Academy of Sciences, pp. 786--797, New York Academy of Sciences. Home/Search Document Not in Database Summary Related Articles Check |
This paper is cited in the following contexts:
Quantum Information Theory - Barnum, III (1998) (Correct)
....iOE j i) 2 : 3.1) Braunstein and Caves [25] defined a statistical distance which is a Riemannian metric on the space of quantum mechanical density operators. This metric may be defined in terms of the structure of correlations between measurements on systems described by such density operators [26, 27], or it may be defined in a way originally due to Wootters [28] who considered only pure states) in terms of the number of distinguishable states lying between two states described by density operators. The form of this metric for infinitesimally separated states is known, and is given by [25] ....
Samuel L. Braunstein and Carlton M. Caves, "Geometry of quantum states," in Fundamental Problems in Quantum Theory: A Conference Held in Honor of John A. Wheeler, D. M. Greenberger and A. Zeilinger, Eds., New York, 1995, vol. 755 of Annals of the New York Academy of Sciences, pp. 786--797, New York Academy of Sciences.
Quantum Information Theory - Barnum, III (1998) (Correct)
....iOE j i) 2 : 3.1) Braunstein and Caves [25] defined a statistical distance which is a Riemannian metric on the space of quantum mechanical density operators. This metric may be defined in terms of the structure of correlations between measurements on systems described by such density operators [26, 27], or it may be defined in a way originally due to Wootters [28] who considered only pure states) in terms of the number of distinguishable states lying between two states described by density operators. The form of this metric for infinitesimally separated states is known, and is given by [25] ....
Samuel L. Braunstein and Carlton M. Caves, "Geometry of quantum states," in Quantum Communications and Measurement, V. P. Belavkin, O. Hirota, and R. L. Hudson, Eds., pp. 21--30. Plenum Press, 1995.
Online articles have much greater impact More about CiteSeer.IST Add search form to your site Submit documents Feedback
CiteSeer.IST - Copyright Penn State and NEC