Riemannian geometry of quantum computation

We continue the work of Crouch and Silva Leite on the geometry of cubic polynomials on Riemannian manifolds. In particular, we generalize the theory of Jacobi fields and conjugate points and present necessary and sufficient optimality conditions.

We study the noncommutative Riemannian geometry of the alternating group A 4 = (Z 2 × Z 2 ) Z 3 using the recent formulation for finite groups. We find a unique 'Levi-Civita' connection for the invariant metric, and find that it has Ricci flat but nonzero Riemann curvature. We show that it is the un

We study the local geometry of the space of horizontal curves with endpoints freely varying in two given submanifolds P and Q of a manifold M endowed with a distribution D ⊂ T M. We give a different proof, that holds in a more general context, of a result by Bismut [Large Deviations and the Malliavi