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Bibliographic Details
Main Authors: Merino, Criel, Moffatt, Iain, Noble, Steven
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2308.13342
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author Merino, Criel
Moffatt, Iain
Noble, Steven
author_facet Merino, Criel
Moffatt, Iain
Noble, Steven
contents Motivated by the appearance of embeddings in the theory of chip firing and the critical group of a graph, we introduce a version of the critical group (or sandpile group) for combinatorial maps, that is, for graphs embedded in orientable surfaces. We provide several definitions of our critical group, by approaching it through analogues of the cycle-cocycle matrix, the Laplacian matrix, and as the group of critical states of a chip firing game (or sandpile model) on the edges of a map. Our group can be regarded as a perturbation of the classical critical group of its underlying graph by topological information, and it agrees with the classical critical group in the plane case. Its cardinality is equal to the number of spanning quasi-trees in a connected map, just as the cardinality of the classical critical group is equal to the number of spanning trees of a connected graph. Our approach exploits the properties of principally unimodular matrices and the methods of delta-matroid theory.
format Preprint
id arxiv_https___arxiv_org_abs_2308_13342
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle The critical group of a combinatorial map
Merino, Criel
Moffatt, Iain
Noble, Steven
Combinatorics
Motivated by the appearance of embeddings in the theory of chip firing and the critical group of a graph, we introduce a version of the critical group (or sandpile group) for combinatorial maps, that is, for graphs embedded in orientable surfaces. We provide several definitions of our critical group, by approaching it through analogues of the cycle-cocycle matrix, the Laplacian matrix, and as the group of critical states of a chip firing game (or sandpile model) on the edges of a map. Our group can be regarded as a perturbation of the classical critical group of its underlying graph by topological information, and it agrees with the classical critical group in the plane case. Its cardinality is equal to the number of spanning quasi-trees in a connected map, just as the cardinality of the classical critical group is equal to the number of spanning trees of a connected graph. Our approach exploits the properties of principally unimodular matrices and the methods of delta-matroid theory.
title The critical group of a combinatorial map
topic Combinatorics
url https://arxiv.org/abs/2308.13342