A relaxation of the strong Bordeaux Conjecture
Abstract
Let c1, c2, ·s, ck be k non-negative integers. A graph G is (c1, c2, ·s, ck)-colorable if the vertex set can be partitioned into k sets V1,V2, …, Vk, such that the subgraph G[Vi], induced by Vi, has maximum degree at most ci for i=1, 2, …, k. Let F denote the family of plane graphs with neither adjacent 3-cycles nor 5-cycle. Borodin and Raspaud (2003) conjectured that each graph in F is (0,0,0)-colorable. In this paper, we prove that each graph in F is (1, 1, 0)-colorable, which improves the results by Xu (2009) and Liu-Li-Yu (2014+).
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