Vertex Ranking of Degenerate Graphs

Abstract

An -vertex-ranking of a graph G is a colouring of the vertices of G with integer colours so that in any connected subgraph H of G with diameter at most , there is a vertex in H whose colour is larger than that of every other vertex in H. The -vertex-ranking number, -vr(G), of G is the minimum integer k such that G has an -vertex-ranking using k colours. We prove that, for any fixed d and , every d-degenerate n-vertex graph G satisfies -vr(G)= O(n1-2/(+1) n) if is even and -vr(G)= O(n1-2/ n) if is odd. The case =2 resolves (up to the n factor) an open problem posed by karpas.neiman.ea:on and the cases ∈\2,3\ are asymptotically optimal (up to the n factor).

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