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FCT
2005
Springer
2005
Springer
Exact Algorithms for Graph Homomorphisms
Graph homomorphism, also called H-coloring, is a natural generalization of graph coloring: There is a homomorphism from a graph G to a complete graph on k vertices if and only if G is k-colorable. During the recent years the topic of exact (exponential-time) algorithms for NP-hard problems in general, and for graph coloring in particular, has led to extensive research. Consequently, it is natural to ask how the techniques developed for exact graph coloring algorithms can be extended to graph homomorphisms. By the celebrated result of Hell and Neˇsetˇril, for each fixed simple graph H, deciding whether a given simple graph G has a homomorphism to H is polynomial-time solvable if H is a bipartite graph, and NP-complete otherwise. The case where H is the cycle of length 5, is the first NP-hard case different from graph coloring. We show that for an odd integer k ≥ 5, whether an input graph G with n vertices is homomorphic to the cycle of length k, can be decided in time min{ ` n n...
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| Added | 27 Jun 2010 |
| Updated | 27 Jun 2010 |
| Type | Conference |
| Year | 2005 |
| Where | FCT |
| Authors | Fedor V. Fomin, Pinar Heggernes, Dieter Kratsch |
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