English

On Representing Matroids via Modular Independence

Combinatorics 2026-03-11 v2

Abstract

We study a matrix-based notion of matroid representation over local commutative rings obtained by replacing linear independence with modular independence. This construction always defines an independence system, though not necessarily a matroid. Under a mild nilpotent hypothesis, we show that chain rings are exactly the local rings for which the minimal number of generators is monotone on finitely generated submodules, and over commutative chain rings we obtain a criterion for the associated independence system to be a matroid. For codes over finite commutative chain rings, we identify puncturing with deletion, show that shortening agrees with contraction under a contractibility hypothesis, and establish duality for free codes. We further derive bounds for simple and uniform matroids, prove that the uniform matroid U2,nU_{2, n} is representable if and only if the size nn is at most the sum of the cardinalities of the local ring and its unique maximal ideal, and show that all excluded minors for F4\mathbb{F}_{4}-representability are representable over Z/4Z\mathbb{Z}/4\mathbb{Z}. The examples also include ring representations of matroids not representable over any field, such as the V\'{a}mos matroid over Z/8Z\mathbb{Z}/8\mathbb{Z}.

Keywords

Cite

@article{arxiv.2603.08016,
  title  = {On Representing Matroids via Modular Independence},
  author = {Koji Imamura and Keisuke Shiromoto},
  journal= {arXiv preprint arXiv:2603.08016},
  year   = {2026}
}

Comments

41 pages, 6 figures

R2 v1 2026-07-01T11:09:44.348Z