关键词: 图着色问题, NP-难解, 部分解, 扰动

Abstract: Graph Coloring Problem（GCP） is one of the typical NP-hard problems in combinatorial optimization problem.The fast and effective approximate algorithms are needed to solve the large scale problem in reasonable computing time.The known approximate algorithm can not give a good enough solution for larger instance in reasonable time.So ILS based Relation of local optimal and global coloring（ILSBR） is proposed.The algorithm is based on the analysis of the relation of local optimal and global optimal coloring of the GCP finding that the partial solution of the global optimal solution is obtained by a very high probability through intersecting the local optimal solutions.Using the partial solution could construct a kind of perturbation strategy（RLG Re-coloring） which then is applied to Iterated Local Search.The experimental results on DIMACS benchmark show that the ILS outperforms the known best ones in the running time without decreasing in the quality of solutions.

Key words: GCP, NP-hard, partial solution, perturbation