The $k$-strong induced arboricity of a graph

TL;DR

This paper introduces the concept of $k$-strong induced arboricity, studies its bounds across various graph classes, and provides specific bounds for graphs with certain properties like tree-width, tree-depth, and planarity.

Contribution

It defines the $k$-strong induced arboricity and establishes bounds for it in minor-closed classes, bounded expansion classes, and specific graph classes such as planar graphs.

Findings

Bounded for minor-closed classes and classes of bounded expansion.

Specific bounds for graphs with bounded tree-width and tree-depth.

Planar graphs have a $f_2(G)$ bound of 310.

Abstract

The induced arboricity of a graph $G$ is the smallest number of induced forests covering the edges of $G$. This is a well-defined parameter bounded from above by the number of edges of $G$ when each forest in a cover consists of exactly one edge. Not all edges of a graph necessarily belong to induced forests with larger components. For $k\geq 1$, we call an edge $k$-valid if it is contained in an induced tree on $k$ edges. The $k$-strong induced arboricity of $G$, denoted by $f_k(G)$, is the smallest number of induced forests with components of sizes at least $k$ that cover all $k$-valid edges in $G$. This parameter is highly non-monotone. However, we prove that for any proper minor-closed graph class $\mathcal{C}$, and more generally for any class of bounded expansion, and any $k \geq 1$, the maximum value of $f_k(G)$ for $G \in \mathcal{C}$ is bounded from above by a constant depending only on $\mathcal{C}$ and $k$. This implies that the adjacent closed vertex-distinguishing number of graphs from a class of bounded expansion is bounded by a constant depending only on the class. We further prove that $f_2(G) \leq 3\binom{t+1}{3}$ for any graph $G$ of tree-width~$t$ and that $f_k(G) \leq (2k)^d$ for any graph of tree-depth $d$. In addition, we prove that $f_2(G) \leq 310$ when $G$ is planar.