Partitioning axis-parallel lines in 3D
Abstract
Let be a set of axis-parallel lines in . We are are interested in partitions of by a set of three planes such that each open cell in the arrangement is intersected by as few lines from as possible. We study such partitions in three settings, depending on the type of splitting planes that we allow. We obtain the following results. There are sets of axis-parallel lines such that, for any set of three splitting planes, there is an open cell in that intersects at least~ lines. If we require the splitting planes to be axis-parallel, then there are sets of axis-parallel lines such that, for any set of three splitting planes, there is an open cell in that intersects at least lines. Furthermore, for any set of axis-parallel lines, there exists a set of three axis-parallel splitting planes such that each open cell in intersects at most lines. For any set of axis-parallel lines, there exists a set of three axis-parallel and mutually orthogonal splitting planes, such that each open cell in intersects at most lines.
Keywords
Cite
@article{arxiv.2204.01772,
title = {Partitioning axis-parallel lines in 3D},
author = {Boris Aronov and Abdul Basit and Mark de Berg and Joachim Gudmundsson},
journal= {arXiv preprint arXiv:2204.01772},
year = {2023}
}
Comments
21 pages, minor changes, accepted to Computing in Geometry and Topology