Coloringofsomecrown-freegraphs

Abstract

Let G and H be two vertex disjoint graphs. The union G H is the graph with V(G H)=V(G) (H) and E(G H)=E(G) E(H). The join G+H is the graph with V(G+H)=V(G)+V(H) and E(G+H)=E(G) E(H)\xy\;|\; x∈ V(G), y∈ V(H)\. We use Pk to denote a path on k vertices, use fork to denote the graph obtained from K1,3 by subdividing an edge once, and use crown to denote the graph K1+K1,3. In this paper, we show that ( 1) (G)32(ω2(G)-ω(G)) if G is (crown, P5)-free, ( 2) (G)12(ω2(G)+ω(G)) if G is (crown, fork)-free, and ( 3) (G)12ω2(G)+32ω(G)+1 if G is (crown, P3 P2)-free.