The Local Structure Theorem for Graph Minors with Finite Index

The Local Structure Theorem (LST) for graph minors roughly states that every $H$-minor free graph $G$ that contains a sufficiently large wall $W$, there is a set of few vertices $A$ such that, upon removing $A$, the resulting graph $G':=G - A$ admits an "almost embedding" $\delta$ into a surface $\Sigma$ in which $H$ does not embed. By almost embedding, we mean that there exists a hypergraph $\mathcal{H}$ whose vertex set is a subset of the vertex set of $G$ and an embedding of $\mathcal{H}$ in $\Sigma$ such that 1) the drawing of each hyperedge of $\mathcal{H}$ corresponds to a cell of $\delta$, 2) the boundary of each cell intersects only the vertices of the corresponding hyperedge, and 3) all remaining vertices and edges of $G'$ are drawn in the interior of cells. The cells corresponding to hyperedges of arity at least $4$, called vortices, are few in number and have small "depth", while a "large" part of the wall $W$ is drawn outside the vortices and is "grounded" in the embedding $\delta$. Now suppose that the subgraphs drawn inside each of the non-vortex cells are equipped with some finite index, i.e., each such cell is assigned a color from a finite set. We prove a version of the LST in which the set $C$ of colors assigned to the non-vortex cells exhibits "large" bidimensionality: The graph $G'$ contains a minor model of a large grid $\Gamma$ where each bag corresponding to a vertex $v$ of $\Gamma$, contains the subgraph drawn within a cell carrying color $\alpha$, for every color $\alpha \in C$. Moreover, the grid $\Gamma$ can be chosen in a way that is "well-connected" to the original wall $W$.