Sold Out
Book Categories |
This work studies length-minimizing arcs in sub-Riemannian manifolds $(M, E, G)$ where the metric $G$ is defined on a rank-two bracket-generating distribution $E$. The authors define a large class of abnormal extremals—the ''regular'' abnormal extremals—and present an analytic technique for proving their local optimality. If $E$ satisfies a mild additional restriction-valid in particular for all regular two-dimensional distributions and for generic two-dimensional distributions—then regular abnormal extremals are ''typical,'' in a sense made precise in the text. So the optimality result implies that the abnormal minimizers are ubiquitous rather than exceptional.
Login|Complaints|Blog|Games|Digital Media|Souls|Obituary|Contact Us|FAQ
CAN'T FIND WHAT YOU'RE LOOKING FOR? CLICK HERE!!! X
You must be logged in to add to WishlistX
This item is in your Wish ListX
This item is in your CollectionShortest paths for sub-Riemannian metrics on rank-two distributions
X
This Item is in Your InventoryShortest paths for sub-Riemannian metrics on rank-two distributions
X
You must be logged in to review the productsX
X
X
Add Shortest paths for sub-Riemannian metrics on rank-two distributions, This work studies length-minimizing arcs in sub-Riemannian manifolds $(M, E, G)$ where the metric $G$ is defined on a rank-two bracket-generating distribution $E$. The authors define a large class of abnormal extremals—the ''regular'' abnormal extremals—a, Shortest paths for sub-Riemannian metrics on rank-two distributions to the inventory that you are selling on WonderClubX
X
Add Shortest paths for sub-Riemannian metrics on rank-two distributions, This work studies length-minimizing arcs in sub-Riemannian manifolds $(M, E, G)$ where the metric $G$ is defined on a rank-two bracket-generating distribution $E$. The authors define a large class of abnormal extremals—the ''regular'' abnormal extremals—a, Shortest paths for sub-Riemannian metrics on rank-two distributions to your collection on WonderClub |