A characterization on orientations of graphs avoiding given lists on out-degrees
Abstract
Let G be a graph and F:V(G)2N be a set function. The graph G is said to be F-avoiding if there exists an orientation O of G such that d+O(v) F(v) for every v∈ V(G), where d+O(v) denotes the out-degree of v in the directed graph G with respect to O. In this paper, we give a Tutte-type good characterization to decide the F-avoiding problem when for every v∈ V(G), |F(v)|≤ 12(dG(v)+1) and F(v) contains no two consecutive integers. Our proof also gives a simple polynomial algorithm to find a desired orientation. As a corollary, we prove the following result: if for every v∈ V(G), |F(v)|≤ 12(dG(v)+1) and F(v) contains no two consecutive integers, then G is F-avoiding. This partly answers a problem proposed by Akbari et. al.(2020)
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