Approximate Shortest Path through a Weighted Planar Subdivision

Abstract

This paper presents an approximation algorithm for finding a shortest path between two points s and t in a weighted planar subdivision . Each face f of is associated with a weight wf, and the cost of travel along a line segment on f is wf multiplied by the Euclidean norm of that line segment. The cost of a path which traverses across several faces of the subdivision is the sum of the costs of travel along each face. Our algorithm progreeses the discretized shortest path wavefront from source s, and takes polynomial time in finding an ε-approximate shortest path.