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ENDM
2007
2007
Acyclic dominating partitions
Given a graph G = (V, E), let P be a partition of V . We say that P is dominating if, for each part P of P, the set V \ P is a dominating set in G (equivalently, if every vertex has a neighbour of a different colour from its own). We say that P is acyclic if for any parts P, P′ of P, the bipartite subgraph G[P, P′] consisting of the edges between P and P′ in P contains no cycles. The acyclic dominating number ad(G) of G is the least number of parts in any partition of V that is both acyclic and dominating; and we shall denote by ad(d) the maximum over all graphs G of maximum degree at most d of ad(G). In this paper, we prove that ad(3) = 2, which establishes a conjecture of Boiron, Sopena and Vignal [4]. For general d, we prove the upper bound ad(d) = O(d ln d) and a lower bound of ad(d) = Ω(d).
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| Added | 13 Dec 2010 |
| Updated | 13 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | ENDM |
| Authors | Louigi Addario-Berry, Ross J. Kang |
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