On the perfect k-divisibility of graphs

Abstract

A graph G is perfectly divisible if, for every induced subgraph H of G, either V(H) is a stable set or admits a partition into two sets X1 and X2 such that ω(H[X1]) < ω(H) and H[X2] is a perfect graph. In this article, we propose the following generalisation of perfectly divisible graphs. A graph G is perfectly 1-divisible if G is perfect and perfectly k-divisible if, for every induced subgraph H of G, either V(H) is a stable set or admits a partition into two sets X1 and X2 such that ω(H[X1]) < ω(H) and H[X2] is perfectly (k-1)-divisible, k ∈ N> 1. Our main result establishes that every perfectly k-divisible graph G satisfies (G) ≤ ω(G)+k-1k which generalises the known bound for perfectly divisible graphs.

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