Connectivity-Preserving Minimum Separator in AT-free Graphs

Abstract

Let A and B be disjoint, non-adjacent vertex-sets in an undirected, connected graph G, whose vertices are associated with positive weights. We address the problem of identifying a minimum-weight subset of vertices S⊂eq V(G) that, when removed, disconnects A from B while preserving the internal connectivity of both A and B. We call such a subset of vertices a connectivity-preserving, or safe minimum A,B-separator. Deciding whether a safe A,B-separator exists is NP-hard by reduction from the 2-disjoint connected subgraphs problem, and remains NP-hard even for restricted graph classes that include planar graphs, and P-free graphs if ≥ 5. In this work, we show that if G is AT-free then in polynomial time we can find a safe A,B-separator of minimum weight, or establish that no safe A,B-separator exists.