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Main Authors: Marcus, Steffen, Phillips, Cameron
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.08349
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author Marcus, Steffen
Phillips, Cameron
author_facet Marcus, Steffen
Phillips, Cameron
contents We study two dimensional and three dimensional tropical subrepresentations of the regular representation $\mathbb{B}[G]$ of a finite group over the tropical booleans, utilizing the theory of group representations over a fixed idempotent semifield as developed by Giansiracusa--Manaker. In dimension two we completely classify all two dimensional tropical subrepresentations of $\mathbb{B}[G]$, provide an explicit characterization for the set of bases of the corresponding matroids, and show an equivalence with the subgroups of $G$. In dimension three we show such an equivalence no longer holds. Towards a classification in dimension three we give a collection of tropical subrepresentations corresponding to subgroups of index 2, and we show that in the special case of finite cyclic groups, one can find three dimensional tropical subrepresentations that do not correspond to subgroups in a similar way.
format Preprint
id arxiv_https___arxiv_org_abs_2410_08349
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Tropical subrepresentations of the boolean regular representation in low dimension
Marcus, Steffen
Phillips, Cameron
Representation Theory
Algebraic Geometry
Combinatorics
12K10, 14T15, 05B35, 05E10, 20C05
We study two dimensional and three dimensional tropical subrepresentations of the regular representation $\mathbb{B}[G]$ of a finite group over the tropical booleans, utilizing the theory of group representations over a fixed idempotent semifield as developed by Giansiracusa--Manaker. In dimension two we completely classify all two dimensional tropical subrepresentations of $\mathbb{B}[G]$, provide an explicit characterization for the set of bases of the corresponding matroids, and show an equivalence with the subgroups of $G$. In dimension three we show such an equivalence no longer holds. Towards a classification in dimension three we give a collection of tropical subrepresentations corresponding to subgroups of index 2, and we show that in the special case of finite cyclic groups, one can find three dimensional tropical subrepresentations that do not correspond to subgroups in a similar way.
title Tropical subrepresentations of the boolean regular representation in low dimension
topic Representation Theory
Algebraic Geometry
Combinatorics
12K10, 14T15, 05B35, 05E10, 20C05
url https://arxiv.org/abs/2410.08349