The grid-minor theorem revisited

Cl\'ement Rambaud; David R. Wood; Gwena\"el Joret; Hoang La; J\k{e}drzej Hodor; Pat Morin; Piotr Micek; Robert Hickingbotham; Vida Dujmovi\'c

arxiv: 2307.02816 · v2 · pith:QVNMRRESnew · submitted 2023-07-06 · 🧮 math.CO · cs.DM

The grid-minor theorem revisited

Vida Dujmovi\'c , Robert Hickingbotham , J\k{e}drzej Hodor , Gwena\"el Joret , Hoang La , Piotr Micek , Pat Morin , Cl\'ement Rambaud

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David R. Wood

This is my paper

classification 🧮 math.CO cs.DM

keywords grapheveryexistsgrid-minorresulttheoremtheretreedepth

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We prove that for every planar graph $X$ of treedepth $h$, there exists a positive integer $c$ such that for every $X$-minor-free graph $G$, there exists a graph $H$ of treewidth at most $f(h)$ such that $G$ is isomorphic to a subgraph of $H\boxtimes K_c$. This is a qualitative strengthening of the Grid-Minor Theorem of Robertson and Seymour (JCTB 1986), and treedepth is the optimal parameter in such a result. As an example application, we use this result to improve the upper bound for weak coloring numbers of graphs excluding a fixed graph as a minor.

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