Constant factor approximation of MAX CLIQUE
Abstract
MAX CLIQUE problem (MCP) is an NPO problem, which asks to find the largest complete sub-graph in a graph (directed or undirected). MCP is well known to be to approximate in polynomial time with an approximation ratio of , for every [9] (and even a polynomial time approximation algorithm with a ratio has been conjectured to be non-existent [2] for MCP). Up to this date, the best known approximation ratio for MCP of a polynomial time algorithm is given by Feige [1]. In this paper, we show that MCP can be approximated with a constant factor in polynomial time through approximation ratio preserving reductions from MCP to MAX DNF and from MAX DNF to MIN SAT. A 2-approximation algorithm for MIN SAT was presented in [6]. An approximation ratio preserving reduction from MIN SAT to min vertex cover improves the approximation ratio to [10]. Hence we prove false the infamous conjecture, which argues that there cannot be a polynomial time algorithm for MCP with an approximation ratio of any constant factor.
Cite
@article{arxiv.1909.04396,
title = {Constant factor approximation of MAX CLIQUE},
author = {Tapani Toivonen and Janne Karttunen},
journal= {arXiv preprint arXiv:1909.04396},
year = {2019}
}
Comments
the reduction does not preserve the approximation ratio