Bures geometry of the three-level quantum systems. II

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).Comment: thirteen pages, LaTeX, four tables, two figures, this paper supersedes math-ph/0012031, "Numerical analyses of a quantum-theoretic eight-dimensional Yang-Mills fields," which will be withdrawn. For part I of this paper (to appear in J. Geom. Phys.), see quant-ph/000806