English

The clique problem on inductive $k$-independent graphs

Discrete Mathematics 2017-09-21 v6

Abstract

A graph is inductive kk-independent if there exists and ordering of its vertices v1,...,vnv_{1},...,v_{n} such that α(G[N(vi)Vi])k\alpha(G[N(v_{i})\cap V_{i}])\leq k where N(vi)N(v_{i}) is the neighborhood of viv_{i}, Vi={vi,...,vn}V_{i}=\{v_{i},...,v_{n}\} and α\alpha is the independence number. In this article, by answering to a question of [Y.Ye, A.Borodin, Elimination graphs, ACM Trans. Algorithms 8 (2) (2012) 14:1-14:23], we design a polynomial time approximation algorithm with ratio {Δ\slashlog(log(Δ)\slashk)\overline{\Delta} \slash log(log(\overline{ \Delta}) \slash k) for the maximum clique and also show that the decision version of this problem is fixed parameter tractable for this particular family of graphs with complexity O(1.2127(p+k1)kn)O(1.2127^{(p+k-1)^{k}}n). Then we study a subclass of inductive kk-independent graphs, namely kk-degenerate graphs. A graph is kk-degenerate if there exists an ordering of its vertices v1,...,vnv_{1},...,v_{n} such that N(vi)Vik|N(v_{i})\cap V_{i}|\leq k . Our contribution is an algorithm computing a maximum clique for this class of graphs in time O(1.2127k(nk+1))O(1.2127^{k}(n-k+1)), thus improving previous best results. We also prove some structural properties for inductive kk-independent graphs.

Keywords

Cite

@article{arxiv.1410.3302,
  title  = {The clique problem on inductive $k$-independent graphs},
  author = {George Manoussakis},
  journal= {arXiv preprint arXiv:1410.3302},
  year   = {2017}
}

Comments

It has been merged with another paper

R2 v1 2026-06-22T06:21:33.363Z