Parameterized Capacitated Vertex Cover Revisited

Abstract

Capacitated Vertex Cover is the hard-capacitated variant of Vertex Cover: given a graph, a capacity for every vertex, and an integer k, the task is to select at most k vertices that cover all edges and assign each edge to one of its chosen endpoints so that no chosen vertex receives more incident edges than its capacity. This problem is a classical benchmark in parameterized complexity, as it was among the first natural problems shown to be W[1]-hard when parameterized by treewidth. We revisit its exact complexity from a fine-grained parameterized perspective and obtain a much sharper picture for several standard parameters. For the natural parameter k, we prove under the Exponential Time Hypothesis (ETH) that no algorithm with running time ko(k) nO(1) exists. In particular, this shows that the known algorithms with running time kO(tw) nO(1) are essentially optimal. We then turn to more general structural parameters. For vertex cover number vc, we give evidence against a 2O(vc2-) nO(1) algorithm, as such an improvement would imply corresponding progress for a broader class of integer-programming-type problems. We complement this barrier with a nearly matching upper bound for vertex integrity vi, improving the previously known double-exponential dependence to an algorithm with running time viO(vi2) nO(1) using N-fold integer programming. For treewidth, we show that the standard dynamic programming algorithm with running time nO(tw) is essentially optimal under the ETH, even if one parameterizes by tree-depth. Turning to clique-width, we prove that Capacitated Vertex Cover remains NP-hard already on graphs of linear clique-width 6...