English

Field extensions, Derivations, and Matroids over Skew Hyperfields

Combinatorics 2018-04-23 v3 Algebraic Geometry

Abstract

We show that a field extension KLK\subseteq L in positive characteristic pp and elements xeLx_e\in L for eEe\in E gives rise to a matroid MσM^\sigma on ground set EE with coefficients in a certain skew hyperfield LσL^\sigma. This skew hyperfield LσL^\sigma is defined in terms of LL and its Frobenius action σ:xxp\sigma:x\mapsto x^p. The matroid underlying MσM^\sigma describes the algebraic dependencies over KK among the xeLx_e\in L , and MσM^\sigma itself comprises, for each mZEm\in \mathbb{Z}^E, the space of KK-derivations of K(xepme:eE)K\left(x_e^{p^{m_e}}: e\in E\right). The theory of matroid representation over hyperfields was developed by Baker and Bowler for commutative hyperfields. We partially extend their theory to skew hyperfields. To prove the duality theorems we need, we use a new axiom scheme in terms of quasi-Pl\"ucker coordinates.

Keywords

Cite

@article{arxiv.1802.02447,
  title  = {Field extensions, Derivations, and Matroids over Skew Hyperfields},
  author = {Rudi Pendavingh},
  journal= {arXiv preprint arXiv:1802.02447},
  year   = {2018}
}

Comments

Changed the signing convention for coordinates to better conform to existing concepts in the literature (Tutte group, quasi-determinants)

R2 v1 2026-06-23T00:14:35.185Z