Bottleneck Convex Subsets: Finding $k$ Large Convex Sets in a Point Set
Abstract
Chv\'{a}tal and Klincsek (1980) gave an -time algorithm for the problem of finding a maximum-cardinality convex subset of an arbitrary given set of points in the plane. This paper examines a generalization of the problem, the Bottleneck Convex Subsets problem: given a set of points in the plane and a positive integer , select pairwise disjoint convex subsets of such that the cardinality of the smallest subset is maximized. Equivalently, a solution maximizes the cardinality of mutually disjoint convex subsets of of equal cardinality. We show the problem is NP-hard when is an arbitrary input parameter, we give an algorithm that solves the problem exactly, with running time polynomial in when is fixed, and we give a fixed-parameter tractable algorithm parameterized in terms of the number of points strictly interior to the convex hull.
Cite
@article{arxiv.2108.12464,
title = {Bottleneck Convex Subsets: Finding $k$ Large Convex Sets in a Point Set},
author = {Stephane Durocher and J. Mark Keil and Saeed Mehrabi and Debajyoti Mondal},
journal= {arXiv preprint arXiv:2108.12464},
year = {2021}
}
Comments
Preliminary results appeared at the 27th International Computing and Combinatorics Conference (COCOON 2021)