Minimum Convex Partitions and Maximum Empty Polytopes
Abstract
Let be a set of points in . A Steiner convex partition is a tiling of with empty convex bodies. For every integer , we show that admits a Steiner convex partition with at most tiles. This bound is the best possible for points in general position in the plane, and it is best possible apart from constant factors in every fixed dimension . We also give the first constant-factor approximation algorithm for computing a minimum Steiner convex partition of a planar point set in general position. Establishing a tight lower bound for the maximum volume of a tile in a Steiner convex partition of any points in the unit cube is equivalent to a famous problem of Danzer and Rogers. It is conjectured that the volume of the largest tile is . Here we give a -approximation algorithm for computing the maximum volume of an empty convex body amidst given points in the -dimensional unit box .
Cite
@article{arxiv.1112.1124,
title = {Minimum Convex Partitions and Maximum Empty Polytopes},
author = {Adrian Dumitrescu and Sariel Har-Peled and Csaba D. Tóth},
journal= {arXiv preprint arXiv:1112.1124},
year = {2014}
}
Comments
16 pages, 4 figures; revised write-up with some running times improved