Characterizing Optimal-speed unitary time evolution of pure and quasi-pure quantum states

Abstract

We present a characterization of the Hamiltonians that generate optimal-speed unitary time evolution and the associated dynamical trajectory, where the initial states are either pure states or quasi-pure quantum states. We construct the manifold of pure states as an orbit under the conjugation action of the Lie group (n) on the manifold of one-dimensional orthogonal projectors, obtaining an isometry with the flag manifold (n)/S(U(1)× U(n-1 )). From this construction, we show that Hamiltonians generating optimal-speed time evolution are fully characterized by equigeodesic vectors of (n)/S(U(1)× U(n-1)). We later extend that result to quasi-pure quantum states.