Planar graphs without 5-cycles and intersecting triangles are (1,1,0)-colorable
Abstract
A (c1,c2,...,ck)-coloring of G is a mapping :V(G)\1,2,...,k\ such that for every i,1 ≤ i ≤ k, G[Vi] has maximum degree at most ci, where G[Vi] denotes the subgraph induced by the vertices colored i. Borodin and Raspaud conjecture that every planar graph without 5-cycles and intersecting triangles is (0,0,0)-colorable. We prove in this paper that such graphs are (1,1,0)-colorable.
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