On minimum-time paths of bounded curvature with position-dependent constraints

Author(s)

Sanfelice, Ricardo G.; Yong, Sze Zheng; Frazzoli, Emilio

Abstract

We consider the problem of a particle traveling from an initial configuration to a final configuration (given by a point in the plane along with a prescribed velocity vector) in minimum time with non-homogeneous velocity and with constraints on the minimum turning radius of the particle over multiple regions of the state space. Necessary conditions for optimality of these paths are derived to characterize the nature of optimal paths, both when the particle is inside a region and when it crosses boundaries between neighboring regions. These conditions are used to characterize families of optimal and nonoptimal paths. Among the optimality conditions, we derive a “refraction” law at the boundary of the regions that generalizes the so-called Snell’s law of refraction in optics to the case of paths with bounded curvature. Tools employed to deduce our results include recent principles of optimality for hybrid systems. A numerical example is given to demonstrate the derived results.

Date issued

2013-12

URI

http://hdl.handle.net/1721.1/109775

Department

Massachusetts Institute of Technology. Laboratory for Information and Decision Systems

Journal

Automatica

Publisher

Elsevier

Citation

Sanfelice, Ricardo G.; Yong, Sze Zheng and Frazzoli, Emilio. “On Minimum-Time Paths of Bounded Curvature with Position-Dependent Constraints.” Automatica 50, no. 2 (February 2014): 537–546 © 2013 Elsevier Ltd

Version: Author's final manuscript

ISSN

0005-1098