Shortest Path Map Equivalence Decompositions and Applications

Abstract

Given a polygonal domain P in the plane, the shortest path map with respect to a point s, denoted by SPM(s), is the decomposition of P into cells such that shortest paths from s to all points t in the same cell have the same vertex sequence. The shortest path map equivalence decomposition of P is the decomposition of P into cells so that SPM(s) is topologically equivalent for all points s in the same cell. In this paper, we prove new upper bounds on the combinatorial complexities of the SPM-equivalence decompositions under various settings, depending on whether s and/or t are restricted to the boundary of P. We also propose new algorithms to compute these decompositions. Further, our results lead to new solutions to several other problems, including answering two-point shortest path queries in P, and computing geodesic diameter and center of P.

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