An Approximation Algorithm for Computing Shortest Paths in Weighted 3-d Domains
Abstract
We present the first polynomial time approximation algorithm for computing shortest paths in weighted three-dimensional domains. Given a polyhedral domain , consisting of tetrahedra with positive weights, and a real number , our algorithm constructs paths in from a fixed source vertex to all vertices of , whose costs are at most times the costs of (weighted) shortest paths, in time, where is a geometric parameter related to the aspect ratios of tetrahedra. The efficiency of the proposed algorithm is based on an in-depth study of the local behavior of geodesic paths and additive Voronoi diagrams in weighted three-dimensional domains, which are of independent interest. The paper extends the results of Aleksandrov, Maheshwari and Sack [JACM 2005] to three dimensions.
Cite
@article{arxiv.1102.3165,
title = {An Approximation Algorithm for Computing Shortest Paths in Weighted 3-d Domains},
author = {Lyudmil Aleksandrov and Hristo Djidjev and Anil Maheshwari and Joerg-Rudiger Sack},
journal= {arXiv preprint arXiv:1102.3165},
year = {2011}
}