Geometric phase for mixed states: a differential geometric approach

Chaturvedi, S. ; Ercolessi, E. ; Marmo, G. ; Morandi, G. ; Mukunda, N. ; Simon, R. (2004) Geometric phase for mixed states: a differential geometric approach European Physical Journal C: Particles and Fields, 35 (3). pp. 413-423. ISSN 1434-6044

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Official URL: http://www.springerlink.com/content/dhwv7gedxjuylv...

Related URL: http://dx.doi.org/10.1140/epjc/s2004-01814-5

Abstract

A new definition and interpretation of the geometric phase for mixed state cyclic unitary evolution in quantum mechanics are presented. The pure state case is formulated in a framework involving three selected principal fiber bundles, and the well-known Kostant-Kirillov-Souriau symplectic structure on (co-) adjoint orbits associated with Lie groups. It is shown that this framework generalizes in a natural and simple manner to the mixed state case. For simplicity, only the case of rank two mixed state density matrices is considered in detail. The extensions of the ideas of null phase curves and Pancharatnam lifts from pure to mixed states are also presented.

Item Type:Article
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ID Code:25369
Deposited On:06 Dec 2010 13:30
Last Modified:17 May 2016 08:51

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