Excluding an apex-forest or a fan as quickly as possible

Abstract

We show that every graph G excluding an apex-forest H as a minor has layered pathwidth at most |V(H)|-2, and that every graph G excluding an apex-linear forest (such as a fan) H as a minor has layered treedepth at most |V(H)|-2. We further show that both bounds are optimal. These results improve on recent results of Hodor, La, Micek, and Rambaud (2025): The first result improves the previous best-known bound by a multiplicative factor of 2, while the second strengthens a previous quadratic bound. In addition, we reduce from quadratic to linear the bound on the S-focused treedepth td(G,S) for graphs G with a prescribed set of vertices S excluding models of paths in which every branch set intersects~S.