Finding a three dimensional shortest path is of importance in the development of automatic path planning for mobile robots and robot manipulators, and for practical implementation, the algorithms need to be efficient. Presented is a method for shortest path planning in three-dimensional space in the presence of convex polyhedra. It is based on the visibility graph approach, extended from two to three-dimensional space. A collineation is introduced for the identification of visible edges in the three-dimensional visibility graph. The principle of minimum potential energy is adopted for finding a set of sub-shortest paths via different edge sequences, and from them the global shortest path is selected. The three dimensional visibility graph is constructed in O(n/sup 3/v/sup k/) time, where n is the number of vertices of the polyhedra, k is the number of obstacles and v is the largest number of vertices on any one obstacle. The process to determine the shortest path runs recursively in polynomial time. Results of a computer simulation are given, showing the versatility and efficiency of the approach.
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机译:找到三维最短路径对于开发移动机器人和机器人操纵器的自动路径规划非常重要,并且对于实际实现而言,算法需要高效。提出了一种在凸多面体存在的情况下在三维空间中进行最短路径规划的方法。它基于可见性图方法,从二维空间扩展到了三维空间。引入归类以识别三维可见性图中的可见边缘。采用最小势能原理,通过不同的边沿序列找到一组子最短路径,并从中选择全局最短路径。三维可见性图以O(n / sup 3 / v / sup k /)时间构建,其中n是多面体的顶点数量,k是障碍物数量,v是任何顶点上的最大顶点数量一个障碍。确定最短路径的过程在多项式时间内递归运行。给出了计算机仿真的结果,显示了该方法的多功能性和效率。
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