Structure of tight (k,0)-stable graphs
Abstract
We say that a graph G is (k,)-stable if removing k vertices from it reduces its independence number by at most . We say that G is tight (k,)-stable if it is (k,)-stable and its independence number equals n-k+12+, the maximum possible, where n is the vertex number of G. Answering a question of Dong and Wu, we show that every tight (2,0)-stable graph with odd vertex number must be an odd cycle. Moreover, we show that for all k≥ 3, every tight (k,0)-stable graph has at most k+6 vertices.
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