Coloring some (P6,C4)-free graphs with -1 colors
Abstract
The Borodin-Kostochka Conjecture states that for a graph G, if (G)≥9, then (G)≤\(G)-1,ω(G)\. We use Pt and Ct to denote a path and a cycle on t vertices, respectively. Let C=v1v2v3v4v5v1 be an induced C5. A C5+ is a graph obtained from C by adding a C3=xyzx and a P2=t1t2 such that (1) x and y are both exactly adjacent to v1,v2,v3 in V(C), z is exactly adjacent to v2 in V(C), t1 is exactly adjacent to v4,v5 in V(C) and t2 is exactly adjacent to v1,v4,v5 in V(C), (2) t1 is exactly adjacent to z in \x,y,z\ and t2 has no neighbors in \x,y,z\. In this paper, we show that the Borodin-Kostochka Conjecture holds for (P6,C4,H)-free graphs, where H∈ \K7,C5+\. This generalizes some results of Gupta and Pradhan in GP21,GP24.
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