Perfect weighted divisibility is equivalent to perfect divisibility
Abstract
A graph is perfectly divisible if for each of its induced subgraph H, V(H) can be partitioned into A and B such that H[A] is perfect and ω(H[B]) < ω(H). A graph G is perfectly weight divisible if for every positive integral weight function on V(G) and each of its induced subgraph H, V(H) can be partitioned into A and B such that H[A] is perfect and the maximum weight of a clique in H[B] is smaller than the maximum weight of a clique in H. In this paper, we prove that the perfect divisibility of a graph is equivalent to its perfect weighted divisibility.
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