Field extensions, Derivations, and Matroids over Skew Hyperfields
Abstract
We show that a field extension in positive characteristic and elements for gives rise to a matroid on ground set with coefficients in a certain skew hyperfield . This skew hyperfield is defined in terms of and its Frobenius action . The matroid underlying describes the algebraic dependencies over among the , and itself comprises, for each , the space of -derivations of . 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)