Generic uniqueness and conjugate points for optimal control problems

Abstract

The paper is concerned with an optimal control problem on Rn, where the dynamics is linear w.r.t.~the control functions. For a terminal cost in a mathcalGδ set of C4(Rn) (i.e., in a countable intersection of open dense subsets), two main results are proved.Namely: the set ⊂Rn of conjugate points is closed, with locally bounded (n-2)-dimensional Hausdorff measure. Moreover, the set of initial points y∈ Rn, which admit two or more globally optimal trajectories, is contained in the union of a locally finite family of embedded manifolds. In particular, the value function is continuously differentiable on an open, dense subset of Rn.