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arxiv: 2304.01823 · v4 · pith:7QG2RZVCnew · submitted 2023-04-04 · 🧮 math.CO · cs.DM· math.DS· math.GR

The structure of quasi-transitive graphs avoiding a minor with applications to the domino problem

classification 🧮 math.CO cs.DMmath.DSmath.GR
keywords minorquasi-transitivefinitegraphavoidingfinitelygraphsgroup
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An infinite graph is quasi-transitive if its vertex set has finitely many orbits under the action of its automorphism group. In this paper we obtain a structure theorem for locally finite quasi-transitive graphs avoiding a minor, which is reminiscent of the Robertson-Seymour Graph Minor Structure Theorem. We prove that every locally finite quasi-transitive graph $G$ avoiding a minor has a tree-decomposition whose torsos are finite or planar; moreover the tree-decomposition is canonical, i.e. invariant under the action of the automorphism group of $G$. As applications of this result, we prove the following. * Every locally finite quasi-transitive graph attains its Hadwiger number, that is, if such a graph contains arbitrarily large clique minors, then it contains an infinite clique minor. This extends a result of Thomassen (1992) who proved it in the 4-connected case and suggested that this assumption could be omitted. * Locally finite quasi-transitive graphs avoiding a minor are accessible (in the sense of Thomassen and Woess), which extends known results on planar graphs to any proper minor-closed family. * Minor-excluded finitely generated groups are accessible (in the group-theoretic sense) and finitely presented, which extends classical results on planar groups. * The domino problem is decidable in a minor-excluded finitely generated group if and only if the group is virtually free, which proves the minor-excluded case of a conjecture of Ballier and Stein (2018).

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Cited by 2 Pith papers

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  1. Almost planar finitely presented groups

    math.GR 2026-05 unverdicted novelty 7.0

    Finitely presented groups with k-planar Cayley graphs have finite-index subgroups with planar Cayley graphs; k-planar coarsely simply connected quasi-transitive graphs are quasi-isometric to planar graphs.

  2. Accessibility, planar graphs, and quasi-isometries

    math.GR 2023-10 unverdicted novelty 7.0

    Connected locally finite quasi-transitive graphs quasi-isometric to planar graphs are accessible, classifying such finitely generated groups as virtually free products of free and surface groups that admit planar Cayl...