Structure of the endpoint map near nice singular curves

Abstract

Given a rank-two sub-Riemannian structure (M,) and a point x0∈ M, a singular curve is a critical point of the endpoint map F:γγ(1) defined on the space of horizontal curves starting at x0. The typical least degenerate singular curves of these structures are called regular singular curves; they are nice if their endpoint is not conjugate along γ. The main goal of this paper is to show that locally around a nice singular curve γ, once we choose a suitable topology on the control space we can find a normal form for the endpoint map, in which F writes as a sum of a linear map and a quadratic form. We also study the restriction of F to the level sets of the action functional and give a Morse-like formula for the inertia index of its Hessian at γ. This is a preparation for a forthcoming generalization of the Morse theory to rank-two sub-Riemannian structures.