The partial inverse minimum cut problem with -norm is strongly NP-hard
The partial inverse minimum cut problem is to minimally modify the capacities of a digraph such that there exists a minimum cut with respect to the new capacities that contains all arcs of a prespecified set. Orlin showed that the problem is strongly NP-hard if the amount of modification is measured by the weighted -norm. We prove that the problem remains hard for the unweighted case and show that the NP-hardness proof of Yang [ (2001) 117–126] for this problem...