Parameterized complexity dichotomy for (r,)-Vertex Deletion

Abstract

For two integers r, ≥ 0, a graph G = (V, E) is an (r,)-graph if V can be partitioned into r independent sets and cliques. In the parameterized (r,)-Vertex Deletion problem, given a graph G and an integer k, one has to decide whether at most k vertices can be removed from G to obtain an (r,)-graph. This problem is NP-hard if r+ ≥ 1 and encompasses several relevant problems such as Vertex Cover and Odd Cycle Transversal. The parameterized complexity of (r,)-Vertex Deletion was known for all values of (r,) except for (2,1), (1,2), and (2,2). We prove that each of these three cases is FPT and, furthermore, solvable in single-exponential time, which is asymptotically optimal in terms of k. We consider as well the version of (r,)-Vertex Deletion where the set of vertices to be removed has to induce an independent set, and provide also a parameterized complexity dichotomy for this problem.