On Robotic Optimal Path Planning in Polygonal Regions With Pseudo-Euclidean Metrics
Zheng Sun, John H. Reif
- 发表年份
- 2007
- 引用次数
- 23
摘要
This paper presents several results on some cost-minimizing path problems in polygonal regions. For these types of problems, an approach often used to compute approximate optimal paths is to apply a discrete search algorithm to a graph G(epsilon) constructed from a discretization of the problem; this graph is guaranteed to contain an epsilon-good approximate optimal path, i.e., a path with a cost within (1 + epsilon) factor of that of an optimal path, between given source and destination points. Here, epsilon > 0 is the user-defined error tolerance ratio. We introduce a class of piecewise pseudo-Euclidean optimal path problems that includes several non-Euclidean optimal path problems previously studied and show that the BUSHWHACK algorithm, which was formerly designed for the weighted region optimal path problem, can be generalized to solve any optimal path problem of this class. We also introduce an empirical method called the adaptive discretization method that improves the performance of the approximation algorithms by placing discretization points densely only in areas that may contain optimal paths. It proceeds in multiple iterations, and in each iteration, it varies the approximation parameters and fine tunes the discretization.
关键词
相关论文
Statistical Learning Theory
Yuhai Wu, Vladimir Vapnik
1999
Artificial intelligence: a modern approach
1995
Fractional Differential Equations
Igor Podlubný
2025
Applied Nonlinear Control
Jean-Jacques Slotine, Weiping Li
1991