English

Online Dominating Set and Coloring for Geometric Intersection Graphs

Computational Geometry 2023-12-07 v1

Abstract

We present online deterministic algorithms for minimum coloring and minimum dominating set problems in the context of geometric intersection graphs. We consider a graph parameter: the independent kissing number ζ\zeta, which is a number equal to `the size of the largest induced star in the graph 1-1'. For a graph with an independent kissing number at most ζ\zeta, we show that the famous greedy algorithm achieves an optimal competitive ratio of ζ\zeta for the minimum dominating set and the minimum independent dominating set problems. However, for the minimum connected dominating set problem, we obtain a competitive ratio of at most 2ζ2\zeta. To complement this, we prove that for the minimum connected dominating set problem, any deterministic online algorithm has a competitive ratio of at least 2(ζ1)2(\zeta-1) for the geometric intersection graph of translates of a convex object in R2\mathbb{R}^2. Next, for the minimum coloring problem, we obtain algorithms having a competitive ratio of O(ζlogm)O\left({\zeta'}{\log m}\right) for geometric intersection graphs of bounded scaled α\alpha-fat objects in Rd\mathbb{R}^d having widths in the interval [1,m][1,m], where ζ\zeta' is the independent kissing number of the geometric intersection graph of bounded scaled α\alpha-fat objects having widths in the interval [1,2][1,2]. Finally, we investigate the value of ζ\zeta for geometric intersection graphs of various families of geometric objects.

Keywords

Cite

@article{arxiv.2312.01467,
  title  = {Online Dominating Set and Coloring for Geometric Intersection Graphs},
  author = {Minati De and Sambhav Khurana and Satyam Singh},
  journal= {arXiv preprint arXiv:2312.01467},
  year   = {2023}
}

Comments

20 pages, 7 figures and 1 table. arXiv admin note: text overlap with arXiv:2111.07812

R2 v1 2026-06-28T13:39:42.760Z