The complexity of convexity number and percolation time in the cycle convexity
Abstract
The subject of graph convexity is well explored in the literature, the so-called interval convexities above all. In this work, we explore the cycle convexity, an interval convexity whose interval function is I(S) = S \u G[S \u\] has a cycle containing u\. In this convexity, we prove that determine whether the convexity number of a graph G is at least k is -complete and [1]-hard when parameterized by the size of the solution when G is a thick spider, but polynomial when G is an extended P4-laden graph. We also prove that determining whether the percolation time of a graph is at least k is -complete even for fixed k ≥ 9, but polynomial for cacti or for fixed k≤2.
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