English

A note on independent sets in sparse-dense graphs

Discrete Mathematics 2022-08-10 v1 Computational Complexity Data Structures and Algorithms

Abstract

Sparse-dense partitions was introduced by Feder, Hell, Klein, and Motwani [STOC 1999, SIDMA 2003] as a tool to solve partitioning problems. In this paper, the following result concerning independent sets in graphs having sparse-dense partitions is presented: if a nn-vertex graph GG admits a sparse-dense partition concerning classes S\mathcal S and D\mathcal D, where D\mathcal D is a subclass of the complement of KtK_t-free graphs (for some ~tt), and graphs in S\mathcal S can be recognized in polynomial time, then: enumerate all maximal independent sets of GG (or find its maximum) can be performed in nO(1)n^{O(1)} time whenever it can be done in polynomial time for graphs in the class S\mathcal S. This result has the following interesting implications: A P versus NP-hard dichotomy for Max. Independent Set on graphs whose vertex set can be partitioned into kk independent sets and \ell cliques, so-called (k,)(k, \ell)-graphs. concerning the values of kk and \ell of (k,)(k, \ell)-graphs. A P-time algorithm that does not require (1,)(1,\ell)-partitions for determining whether a (1,)(1,\ell)-graph GG is well-covered. Well-covered graphs are graphs in which every maximal independent set has the same cardinality. The characterization of conflict graph classes for which the conflict version of a P-time graph problem is still in P assuming such classes. Conflict versions of graph problems ask for solutions avoiding pairs of conflicting elements (vertices or edges) described in conflict graphs.

Keywords

Cite

@article{arxiv.2208.04408,
  title  = {A note on independent sets in sparse-dense graphs},
  author = {Uéverton S. Souza},
  journal= {arXiv preprint arXiv:2208.04408},
  year   = {2022}
}
R2 v1 2026-06-25T01:34:49.910Z