Line-Constrained $k$-Semi-Obnoxious Facility Location
Abstract
Suppose we are given a set of blue points and a set of red points, all lying above a horizontal line , in the plane. Let the weight of a given point be if and if , , and () be the interior of any geometric object . We wish to pack non-overlapping congruent disks , , \ldots, of minimum radius, centered on such that is maximized, i.e., the sum of the weights of the points covered by is maximized. Here, the disks are the obnoxious or undesirable facilities generating nuisance or damage (with quantity equal to ) to every demand point (e.g., population center) lying in their interior. In contrast, they are the desirable facilities giving service (equal to ) to every demand point covered by them. The line represents a straight highway or railway line. These semi-obnoxious facilities need to be established on to receive the largest possible overall service for the nearby attractive demand points while causing minimum damage to the nearby repelling demand points. We show that the problem can be solved optimally in time. Subsequently, we improve the running time to . The above-weighted variation of locating semi-obnoxious facilities may generalize the problem that Bereg et al. (2015) studied where i.e., the smallest radius maximum weight circle is to be centered on a line. Furthermore, we addressed two special cases of the problem where points do not have arbitrary weights.
Keywords
Cite
@article{arxiv.2307.03488,
title = {Line-Constrained $k$-Semi-Obnoxious Facility Location},
author = {Vishwanath R. Singireddy and Manjanna Basappa and N. R. Aravind},
journal= {arXiv preprint arXiv:2307.03488},
year = {2023}
}