Abstract
A conditional shortest path is a collision-free path of shortest distance based known information an obstacle-scattered environment at a given time. This paper investigates the problem of finding a conditional L/sub 2/ 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 L/sub 2/ distance transform through the use of a circular path-planning wave. The proposed method is based 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.
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