Combing a Linkage in an Annulus

TL;DR

This paper extends the Unique Linkage Theorem by proving a variant involving nested cycles in planar graphs, allowing for more flexible linkages that can be internally 'combed' by a given linkage, with applications to path routing.

Contribution

It introduces a generalized linkage result for embedded graphs with nested cycles, accommodating scattered linkages and internal pattern vertices, broadening the theorem's applicability.

Findings

Established a new linkage variant for nested cycles in planar graphs.

Proved the existence of functions controlling linkage size and nested cycle length.

Applied the result to multiple path routing problems in embedded graphs.

Abstract

A linkage in a graph $G$ of size $k$ is a subgraph $L$ of $G$ whose connected components are $k$ paths. The pattern of a linkage of size $k$ is the set of $k$ pairs formed by the endpoints of these paths. A consequence of the Unique Linkage Theorem is the following: there exists a function $f:\mathbb{N}\to\mathbb{N}$ such that if a plane graph $G$ contains a sequence $\mathcal{C}$ of at least $f(k)$ nested cycles and a linkage of size at most $k$ whose pattern vertices lay outside the outer cycle of $\mathcal{C},$ then $G$ contains a linkage with the same pattern avoiding the inner cycle of $\mathcal{C}$. In this paper we prove the following variant of this result: Assume that all the cycles in $\mathcal{C}$ are "orthogonally" traversed by a linkage $P$ and $L$ is a linkage whose pattern vertices may lay either outside the outer cycle or inside the inner cycle of $\mathcal{C}:=[C_{1},\ldots,C_{p},\ldots,C_{2p-1}]$. We prove that there are two functions $g,f:\mathbb{N}\to\mathbb{N}$, such that if $L$ has size at most $k$, $P$ has size at least $f(k),$ and $|\mathcal{C}|\geq g(k)$, then there is a linkage with the same pattern as $L$ that is "internally combed" by $P$, in the sense that $L\cap C_{p}\subseteq P\cap C_{p}$. In fact, we prove this result in the most general version where the linkage $L$ is $s$-scattered: no two vertices of distinct paths of $L$ are within distance at most $s$. We deduce several variants of this result in the cases where $s=0$ and $s>0$. These variants permit the application of the unique linkage theorem on several path routing problems on embedded graphs.