Abstract:
Two problems of sub-Lorentzian geometry on the Martinet distribution are studied. For the first one, the reachable set has a nontrivial intersection with the Martinet plane, while a trivial intersection occurs for the second problem. Reachable sets, optimal trajectories, and sub-Lorentzian distances and spheres are described.
Keywords:sub-Lorentzian geometry, geometric control theory, Martinet distribution.
UDC:
516.968
Presented:R. V. Gamkrelidze Received: 27.02.2024 Revised: 28.03.2024 Accepted: 10.04.2024
