A 2 k Kernel for -Component Order Connectivity

Abstract

In the -Component Order Connectivity problem ( ∈ N), we are given a graph G on n vertices, m edges and a non-negative integer k and asks whether there exists a set of vertices S⊂eq V(G) such that |S|≤ k and the size of the largest connected component in G-S is at most . In this paper, we give a linear programming based kernel for -Component Order Connectivity with at most 2 k vertices that takes nO() time for every constant . Thereafter, we provide a separation oracle for the LP of -COC implying that the kernel only takes (3e)· nO(1) time. On the way to obtaining our kernel, we prove a generalization of the q-Expansion Lemma to weighted graphs. This generalization may be of independent interest.