Clustered independence and bounded treewidth

Abstract

A set S⊂eq V of vertices of a graph G is a c-clustered set if it induces a subgraph with components of order at most c each, and αc(G) denotes the size of a largest c-clustered set. For any graph G on n vertices and treewidth k, we show that αc(G) ≥ cc+k+1n, which improves a result of Dvořák and Wood [Innov.\ Graph Theory, 2025], while we construct n-vertex graphs G of treewidth k with αc(G)≤ cc+kn. In the case c≤ 2 or k=1 we prove the better lower bound αc(G) ≥ cc+kn, which settles a conjecture of Chappell and Pelsmajer [Electron.\ J.\ Comb., 2013] and is best-possible. Finally, in the case c=3 and k=2, we show αc(G) ≥ 59n which is best-possible.