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DM
2010
2010
Large induced subgraphs with equated maximum degree
For a graph G, denote by fk(G) the smallest number of vertices that must be deleted from G so that the remaining induced subgraph has its maximum degree shared by at least k vertices. It is not difficult to prove that there are graphs for which already f2(G) n(1 - o(1)), where n is the number of vertices of G. It is conjectured that fk(G) = ( n) for every fixed k. We prove this for k = 2, 3. While the proof for the case k = 2 is easy, already the proof for the case k = 3 is considerably more difficult. The case k = 4 remains open. A related parameter, sk(G), denotes the maximum integer m so that there are k vertexdisjoint subgraphs of G, each with m vertices, and with the same maximum degree. We prove that for every fixed k, sk(G) n/k - o(n). The proof relies on probabilistic arguments.
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| Added | 10 Dec 2010 |
| Updated | 10 Dec 2010 |
| Type | Journal |
| Year | 2010 |
| Where | DM |
| Authors | Yair Caro, Raphael Yuster |
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