English

On $r$-Guarding Thin Orthogonal Polygons

Computational Geometry 2016-04-26 v1

Abstract

Guarding a polygon with few guards is an old and well-studied problem in computational geometry. Here we consider the following variant: We assume that the polygon is orthogonal and thin in some sense, and we consider a point pp to guard a point qq if and only if the minimum axis-aligned rectangle spanned by pp and qq is inside the polygon. A simple proof shows that this problem is NP-hard on orthogonal polygons with holes, even if the polygon is thin. If there are no holes, then a thin polygon becomes a tree polygon in the sense that the so-called dual graph of the polygon is a tree. It was known that finding the minimum set of rr-guards is polynomial for tree polygons, but the run-time was O~(n17)\tilde{O}(n^{17}). We show here that with a different approach the running time becomes linear, answering a question posed by Biedl et al. (SoCG 2011). Furthermore, the approach is much more general, allowing to specify subsets of points to guard and guards to use, and it generalizes to polygons with hh holes or thickness KK, becoming fixed-parameter tractable in h+Kh+K.

Keywords

Cite

@article{arxiv.1604.07100,
  title  = {On $r$-Guarding Thin Orthogonal Polygons},
  author = {Therese Biedl and Saeed Mehrabi},
  journal= {arXiv preprint arXiv:1604.07100},
  year   = {2016}
}

Comments

18 pages

R2 v1 2026-06-22T13:39:43.072Z