On the complexity of minimum-link path problems
Abstract
We revisit the minimum-link path problem: Given a polyhedral domain and two points in it, connect the points by a polygonal path with minimum number of edges. We consider settings where the vertices and/or the edges of the path are restricted to lie on the boundary of the domain, or can be in its interior. Our results include bit complexity bounds, a novel general hardness construction, and a polynomial-time approximation scheme. We fully characterize the situation in 2D, and provide first results in dimensions 3 and higher for several variants of the problem. Concretely, our results resolve several open problems. We prove that computing the minimum-link diffuse reflection path, motivated by ray tracing in computer graphics, is NP-hard, even for two-dimensional polygonal domains with holes. This has remained an open problem [1] despite a large body of work on the topic. We also resolve the open problem from [2] mentioned in the handbook [3] (see Chapter 27.5, Open problem 3) and The Open Problems Project [4] (see Problem 22): "What is the complexity of the minimum-link path problem in 3-space?" Our results imply that the problem is NP-hard even on terrains (and hence, due to discreteness of the answer, there is no FPTAS unless P=NP), but admits a PTAS.
Cite
@article{arxiv.1603.06972,
title = {On the complexity of minimum-link path problems},
author = {Irina Kostitsyna and Maarten Löffler and Valentin Polishchuk and Frank Staals},
journal= {arXiv preprint arXiv:1603.06972},
year = {2019}
}
Comments
An abridged version of this paper appeared in the proceedings of the 32nd International Symposium on Computational Geometry in 2016