On the Hardness of Approximating the Chromatic Number |
| |
| Authors: | Sanjeev Khanna Nathan Linial Shmuel Safra |
| |
| Affiliation: | (1) Department of Computer and Information Science, University of Pennsylvania; Philadelphia, PA 19104, USA; E-mail: sanjeev@cis.upenn.edu, US;(2) Institute of Computer Science, Hebrew University of Jerusalem; Jerusalem 91904, Israel; E-mail: nati@cs.huji.ac.il, US;(3) Department of Computer Science, Tel Aviv University; Tel Aviv 69978, Israel; E-mail: safra@math.tau.ac.il, IL |
| |
| Abstract: | k -colorable for some fixed . Our main result is that it is NP-hard to find a 4-coloring of a 3-chromatic graph. As an immediate corollary we obtain that it is NP-hard to color a k-chromatic graph with at most colors. We also give simple proofs of two results of Lund and Yannakakis [20]. The first result shows that it is NP-hard to approximate the chromatic number to within for some fixed ε > 0. We point here that this hardness result applies only to graphs with large chromatic numbers. The second result shows that for any positive constant h, there exists an integer , such that it is NP-hard to decide whether a given graph G is -chromatic or any coloring of G requires colors. Received April 11, 1997/Revised June 10, 1999 |
| |
| Keywords: | AMS Subject Classification (1991) Classes: 68Q17, 68Q25, 68R10 |
| 本文献已被 SpringerLink 等数据库收录! |
|
