A polynomial kernel for 3-leaf power deletion

Abstract

For a non-negative integer , the -leaf power of a tree T is a simple graph G on the leaves of T such that two vertices are adjacent in G if and only if their distance in T is at most . We provide a polynomial kernel for the problem of deciding whether we can delete at most k vertices to make an input graph a 3-leaf power of some tree. More specifically, we present a polynomial-time algorithm for an input instance (G,k) for the problem to output an equivalent instance (G',k') such that k'≤ k and G' has at most O(k14) vertices.