Volume Fractions of the Kinematic "Near-Critical" Sets of the Quantum Ensemble Control Landscape

Abstract

An estimate is derived for the volume fraction of a subset CεP = \U : ||grad J(U)|≤ ε\⊂U(N) in the neighborhood of the critical set CP(n)PU(m) of the kinematic quantum ensemble control landscape J(U) = Tr(U U' O), where U represents the unitary time evolution operator, is the initial density matrix of the ensemble, and O is an observable operator. This estimate is based on the Hilbert-Schmidt geometry for the unitary group and a first-order approximation of ||grad J(U)||2. An upper bound on these near-critical volumes is conjectured and supported by numerical simulation, leading to an asymptotic analysis as the dimension N of the quantum system rises in which the volume fractions of these "near-critical" sets decrease to zero as N increases. This result helps explain the apparent lack of influence exerted by the many saddles of J over the gradient flow.