Simultaneous Feedback Edge Set: A Parameterized Perspective

Abstract

In this paper we consider Simultaneous Feedback Edge Set (Sim-FES) problem. In this problem, the input is an n-vertex graph G, an integer k and a coloring function col: E(G) → 2[α] and the objective is to check whether there is an edge subset S of cardinality at most k in G such that for all i ∈ [α], Gi - S is acyclic. Here, Gi=(V(G), \e∈ E(G) i ∈ col(e)\) and [α]=\1,…,α\. When α =1, the problem is polynomial time solvable. We show that for α =3 Sim-FES is NP-hard by giving a reduction from Vertex Cover on cubic graphs. The same reduction shows that the problem does not admit an algorithm of running time O(2o(k)nO(1)) unless ETH fails. This hardness result is complimented by an FPT algorithm for Sim-FES running in time O(2ω kα+α k nO(1)), where ω is the exponent in the running time of matrix multiplication. The same algorithm gives a polynomial time algorithm for the case when α =2. We also give a kernel for Sim-FES with (kα)O(α) vertices. Finally, we consider the problem Maximum Simultaneous Acyclic Subgraph. Here, the input is a graph G, an integer q and, a coloring function col: E(G) → 2[α]. The question is whether there is a edge subset F of cardinality at least q in G such that for all i∈ [α], G[Fi] is acyclic. Here, Fi=\e ∈ F i ∈ col(e)\. We give an FPT algorithm for running in time O(2ω q αnO(1)).