Linear-Vertex Kernel for the Problem of Packing r-Stars into a Graph without Long Induced Paths

Abstract

Let integers r 2 and d 3 be fixed. Let Gd be the set of graphs with no induced path on d vertices. We study the problem of packing k vertex-disjoint copies of K1,r (k 2) into a graph G from parameterized preprocessing, i.e., kernelization, point of view. We show that every graph G∈ Gd can be reduced, in polynomial time, to a graph G'∈ Gd with O(k) vertices such that G has at least k vertex-disjoint copies of K1,r if and only if G' has. Such a result is known for arbitrary graphs G when r=2 and we conjecture that it holds for every r 2.