The four-in-a-tree problem in triangle-free graphs
Abstract
The three-in-a-tree algorithm of Chudnovsky and Seymour decides in time whether three given vertices of a graph belong to an induced tree. Here, we study four-in-a-tree for triangle-free graphs. We give a structural answer to the following question: what does a triangle-free graph look like if no induced tree covers four given vertices? Our main result says that any such graph must have the "same structure", in a sense to be defined precisely, as a square or a cube. We provide an -time algorithm that given a triangle-free graph together with four vertices outputs either an induced tree that contains them or a partition of certifying that no such tree exists. We prove that the problem of deciding whether there exists a tree covering the four vertices such that at most one vertex of has degree at least 3 is NP-complete.
Cite
@article{arxiv.1309.0978,
title = {The four-in-a-tree problem in triangle-free graphs},
author = {Nicolas Derhy and Christophe Picouleau and Nicolas Trotignon},
journal= {arXiv preprint arXiv:1309.0978},
year = {2013}
}