Sparse critical graphs for defective (1,3)-coloring
Abstract
A graph G is (1,3)-colorable if its vertices can be partitioned into subsets V1 and V2 so that every vertex in G[V1] has degree at most 1 and every vertex in G[V2] has degree at most 3. We prove that every graph with maximum average degree at most 28/9 is (1, 3)-colorable.
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