📝 SummarXiv

Abstract

This paper presents a reachability-based approach to finite-time transition problem of nonlinear systems between two stationary points (i.e., the point-to-point steering problem). When the target state is reachable, we prove that a solution can always be constructed by concatenation of two Pontraygin extremals. This allows to formulate the problem as a two-point boundary value problem (TPBVP) of extremals, where the solution existence to the formulated TPBVP is equivalent to that of the original problem. The theoretical developments are applied to curves with prescribed curvature bounds in R3, thereby extending the recent works on Dubins car to dimension three. We prove that to construct a curvature-bounded path in R3 with prescribed length and boundary conditions, it suffices to consider the trajectories that are concatenations of CSC, CCC, their subsegments, and H, where C denotes a circular arc with maximum curvature, S a straight line segment, and H a certain class of helicoidal arcs with constant curvature. Numerical demonstrations are conducted on a nonlinear dynamics example, and on curvature-bounded paths in R2 and R3.