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This article is cited in 44 scientific papers (total in 44 papers)
Extremal trajectories in a nilpotent sub-Riemannian problem on the Engel group
A. A. Ardentov, Yu. L. Sachkov Program Systems Institute of RAS
Abstract:
On the Engel group a nilpotent sub-Riemannian problem is considered, a 4-dimensional optimal control problem with a 2-dimensional linear control and an integral cost functional. It arises as a nilpotent approximation to nonholonomic systems with 2-dimensional control in a 4-dimensional space (for example, a system describing the navigation of a mobile robot with trailer). A parametrization of extremal trajectories by Jacobi functions is obtained. A discrete symmetry group and its fixed points, which are Maxwell points, are described. An estimate for the cut time (the time of the loss of optimality) on extremal trajectories
is derived on this basis.
Bibliography: 25 titles.
Keywords:
optimal control, sub-Riemannian geometry, geometric methods, Engel group.
Received: 21.07.2010 and 10.02.2011
Citation:
A. A. Ardentov, Yu. L. Sachkov, “Extremal trajectories in a nilpotent sub-Riemannian problem on the Engel group”, Sb. Math., 202:11 (2011), 1593–1615
Linking options:
https://www.mathnet.ru/eng/sm7774https://doi.org/10.1070/SM2011v202n11ABEH004200 https://www.mathnet.ru/eng/sm/v202/i11/p31
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Abstract page: | 996 | Russian version PDF: | 355 | English version PDF: | 36 | References: | 89 | First page: | 31 |
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