Title :
Planning conditional shortest paths through an unknown environment: a framed-quadtree approach
Author :
Chen, Danny Z. ; Szczerba, Robert J. ; Uhran, John J., Jr.
Author_Institution :
Dept. of Comput. Sci. & Eng., Notre Dame Univ., IN, USA
Abstract :
A conditional shortest path is a collision-free path of shortest distance based on known information on an obstacle-scattered environment at a given time. This paper investigates the problem of finding a conditional L2 shortest path through an unknown environment in which path planning is implemented “on the fly” as new obstacle information becomes available through external sensors. We propose a novel cell decomposition approach which calculates an L2 distance transform through the use of a circular path-planning wave. The proposed method is based on a new data structure, called the framed-quadtree, which combines together the accuracy of grid-based path planning techniques with the efficiency of quadtree-based techniques, hence having the advantages of both. The heart of this method is a linear time algorithm for computing dynamic Voronoi diagrams
Keywords :
computational geometry; minimisation; path planning; quadtrees; L2 distance transform; cell decomposition; circular path-planning wave; collision-free path; conditional L2 shortest path; conditional shortest path planning; dynamic Voronoi diagrams; framed-quadtree approach; linear time algorithm; obstacle-scattered environment; unknown environment; Computer science; Costs; Data structures; Grid computing; Heart; Mesh generation; Path planning; Region 6; Shape; Size measurement;
Conference_Titel :
Intelligent Robots and Systems 95. 'Human Robot Interaction and Cooperative Robots', Proceedings. 1995 IEEE/RSJ International Conference on
Conference_Location :
Pittsburgh, PA
Print_ISBN :
0-8186-7108-4
DOI :
10.1109/IROS.1995.525858
