Asymptotic structure. II. Path-width and additive quasi-isometry
Tung Nguyen, Alex Scott, Paul Seymour
Published: 2025/9/10
Abstract
We show that if a graph $G$ admits a quasi-isometry $\phi$ to a graph $H$ of bounded path-width, then we can assign a non-negative integer length to each edge of $H$, such that the same function $\phi$ is a quasi-isometry to this weighted version of $H$, with error only an additive constant.