A Complexity Analysis of the c-Closed Vertex Deletion Problem
Abstract
A graph is c-closed when every pair of nonadjacent vertices has at most c-1 common neighbors. In c-Closed Vertex Deletion, the input is a graph G and an integer k and we ask whether G can be transformed into a c-closed graph by deleting at most k vertices. We study the classic and parameterized complexity of c-Closed Vertex Deletion. We obtain, for example, NP-hardness for the case that G is bipartite with bounded maximum degree. We also show upper and lower bounds on the size of problem kernels for the parameter k and introduce a new parameter, the number x of vertices in bad pairs, for which we show a problem kernel of size O(x3 + x2· c)). Here, a pair of nonadjacent vertices is bad if they have at least c common neighbors. Finally, we show that c-Closed Vertex Deletion can be solved in polynomial time on unit interval graphs with depth at most c+1 and that it is fixed-parameter tractable with respect to the neighborhood diversity of G.
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