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ARSCOM
1999
1999
Refining the Graph Density Condition for the Existence of Almost K-factors
Alon and Yuster [4] have proven that if a fixed graph K on g vertices is (h + 1)-colorable, then any graph G with n vertices and minimum degree at least h h+1 n contains at least (1 - )n g vertex disjoint copies of K, provided n > N( ). It is shown here that the required minimum degree of G for this result to follow is closer to h-1 h n, provided K has a proper (h + 1)-coloring in which some of the colors occur rarely. A conjecture regarding the best possible result of this type is suggested.
Real-time TrafficAlon | ARSCOM 1999 | Fixed Graph | Minimum Degree |
| Added | 22 Dec 2010 |
| Updated | 22 Dec 2010 |
| Type | Journal |
| Year | 1999 |
| Where | ARSCOM |
| Authors | Noga Alon, Eldar Fischer |
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