On critical graphs for the chromatic edge-stability number
Abstract
The chromatic edge-stability number es(G) of a graph G is the minimum number of edges whose removal results in a spanning subgraph with the chromatic number smaller than that of G. A graph G is called (3,2)-critical if (G)=3, es(G)=2 and for any edge e∈ E(G), es(G-e)<es(G). In this paper, we characterize (3,2)-critical graphs which contain at least five odd cycles. This answers a question proposed by Bresar, Klavzar and Movarraei in [Critical graphs for the chromatic edge-stability number, Discrete Math. 343(2020) 111845].
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