Polynomial Kernels for Spanning Tree with Diversity Requirements

Abstract

Given a connected undirected graph G, a spanning tree is a subgraph T of G such that V(T) = V(G) and T is a tree. A collection of spanning trees T1,…,T is pairwise k-diverse if for every i ≠ j, |E(Ti) E(Tj)| ≥ k. Given a connected undirected graph G and integers p, q, k, , Leaf & Internal-Constrained Diverse Spanning Trees asks whether there are distinct spanning trees T1,…,T of G that are pairwise k-diverse such that each tree has at least p leaves and at least q internal vertices. Similarly, Leaf & Non-terminal-Constrained Diverse Spanning Trees takes a connected undirected graph G, VNT⊂eq V(G), and three integers p, k, , and asks if G has spanning trees that are pairwise k-diverse, and each has at least p leaves and conains the vertices of VNT as internal. We consider these two problems from the kernelization perspective and provide polynomial kernels for Leaf & Internal-Constrained Diverse Spanning Trees and Leaf & Non-terminal-Constrained Diverse Spanning Trees, when parameterized by p + q + k + and p + |V NT| + k + , respectively.