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IPL
2006
2006
On computing the smallest four-coloring of planar graphs and non-self-reducible sets in P
We show that computing the lexicographically first four-coloring for planar graphs is p 2hard. This result optimally improves upon a result of Khuller and Vazirani who prove this problem NP-hard, and conclude that it is not self-reducible in the sense of Schnorr, assuming P = NP. We discuss this application to non-self-reducibility and provide a general related result. We also discuss when raising a problem's NP-hardness lower bound to p 2hardness can be valuable. Key words: computational complexity, graph colorability, self-reducibility
Real-time Traffic| Added | 13 Dec 2010 |
| Updated | 13 Dec 2010 |
| Type | Journal |
| Year | 2006 |
| Where | IPL |
| Authors | André Große, Jörg Rothe, Gerd Wechsung |
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