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Bures geometry of the three-level quantum systems. II | Paul B. Slater
; | Date: |
26 Feb 2001 | Subject: | Mathematical Physics; Computational Physics; Differential Geometry | math-ph math.DG math.MP physics.comp-ph quant-ph | Affiliation: | University of California | Abstract: | For the eight-dimensional Riemannian manifold comprised by the three-level quantum systems endowed with the Bures metric, we numerically approximate the integrals over the manifold of several functions of the curvature and of its (anti-)self-dual parts. The motivation for pursuing this research is to elaborate upon the findings of Dittmann in his paper, "Yang-Mills equation and Bures metric" (quant-ph/9806018). | Source: | arXiv, math-ph/0102032 | Services: | Forum | Review | PDF | Favorites |
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