论文信息 - Improved algorithm to determine 3-colorability of graphs with minimum degree at least 7

Improved algorithm to determine 3-colorability of graphs with minimum degree at least 7

Let $G$ be an $n$-vertex graph with the maximum degree $\Delta$ and the minimum degree $\delta$. We give algorithms with complexity $O(1.3158^{n-0.7~\Delta(G)})$ and $O(1.32^{n-0.73~\Delta(G)})$ that determines if $G$ is 3-colorable, when $\delta(G)\geq 8$ and $\delta(G)\geq 7$, respectively.

Katerina Potika | Nicholas Crawford | Sogol Jahanbekam

[1] Nicos Christofides,et al. An Algorithm for the Chromatic Number of a Graph , 1971, Comput. J..

[2] Fedor V. Fomin,et al. Improved Exact Algorithms for Counting 3- and 4-Colorings , 2007, COCOON.

[3] Zsolt Tuza,et al. Algorithmic complexity of list colorings , 1994, Discret. Appl. Math..

[4] D. West. Introduction to Graph Theory , 1995 .

[5] David Eppstein,et al. 3-Coloring in Time O(1.3289^n) , 2000, J. Algorithms.

[6] Andreas Björklund,et al. Set Partitioning via Inclusion-Exclusion , 2009, SIAM J. Comput..

[7] Carsten Lund,et al. On the hardness of approximating minimization problems , 1994, JACM.

[8] Small Maximal Independent Sets and Faster Exact Graph Coloring , 2003 .

[9] Eugene L. Lawler,et al. A Note on the Complexity of the Chromatic Number Problem , 1976, Inf. Process. Lett..