On Regularity of Abnormal Subriemannian Geodesics
arXiv:1202.4287
Abstract
We prove the smoothness of abnormal minimizers of subriemannian manifolds of step 3 with a nilpotent basis. We prove that rank 2 Carnot groups of step 4 admit no strictly abnormal minimizers. For any subriemannian manifolds of step less than 7, we show all abnormal minimizers have no corner type singularities, which partly generalize the main result of Leonardi-Monti.
This paper has been withdrawn by the author due to a crucial computation error in (F_t^1)_star