Large Induced Subgraphs of Bounded Degree in Outerplanar and Planar Graphs

TL;DR

This paper investigates the maximum size of induced subgraphs with bounded degree in outerplanar and planar graphs, providing bounds and constructions for such subgraphs.

Contribution

It establishes new upper and lower bounds on the size of large induced subgraphs with degree at most k in planar and outerplanar graphs.

Findings

Every n-vertex planar graph has an induced subgraph with degree at most 3 and at least 5n/13 vertices.

There exist planar graphs where the largest degree-3 induced subgraph has fewer than 4n/7 + O(1) vertices.

Bounds are provided for induced subgraphs of bounded degree in outerplanar graphs.

Abstract

In this paper, we study the following question. Let $\mathcal G$ be a family of planar graphs and let $k\geq 3$ be an integer. What is the largest value $f_k(n)$ such that every $n$-vertex graph in $\mathcal G$ has an induced subgraph with degree at most $k$ and with $f_k(n)$ vertices? Similar questions, in which one seeks a large induced forest, or a large induced linear forest, or a large induced $d$-degenerate graph, rather than a large induced graph of bounded degree, have been studied for decades and have given rise to some of the most fascinating and elusive conjectures in Graph Theory. We tackle our problem when $\mathcal G$ is the class of the outerplanar graphs or the class of the planar graphs. In both cases, we provide upper and lower bounds on the value of $f_k(n)$. For example, we prove that every $n$-vertex planar graph has an induced subgraph with degree at most $3$ and with $\frac{5n}{13}>0.384n$ vertices, and that there exist $n$-vertex planar graphs whose largest induced subgraph with degree at most $3$ has $\frac{4n}{7}+O(1)<0.572n+O(1)$ vertices.