Perfect divisibility and 2-divisibility
Abstract
A graph G is said to be 2-divisible if for all (nonempty) induced subgraphs H of G, V(H) can be partitioned into two sets A,B such that ω(A) < ω(H) and ω(B) < ω(H). A graph G is said to be perfectly divisible if for all induced subgraphs H of G, V(H) can be partitioned into two sets A,B such that H[A] is perfect and ω(B) < ω(H). We prove that if a graph is (P5,C5)-free, then it is 2-divisible. We also prove that if a graph is bull-free and either odd-hole-free or P5-free, then it is perfectly divisible.
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