Clonal cores and flexipaths in matroids
Abstract
A partitioned matroid consists of a matroid and a partition of its ground set. As such structures arise frequently in structural matroid theory, this paper introduces a general technique for analyzing those special properties of partitioned matroids that depend solely on the values of the connectivities , the local connectivities , and the dual local connectivities . In particular, we consider those partitioned matroids in which each is an independent, coindependent set of clones of cardinality . Calling such partitioned matroids clonal-core matroids, we show that special results of the above type for partitioned matroids can be verified in general by proving them just for clonal-core matroids. Aiming at the long-term goal of finding the unavoidable minors of -connected matroids, we illustrate this technique by studying -paths. These are sequences of sets that partition the ground set of a matroid so that the union of any proper initial segment of parts is -separating. Viewing the ends and as fixed, we call such a partition a -flexipath if is a -path for all permutations of . A straightforward simplification enables us to focus on -flexipaths for some in , that is, those -flexipaths for which and for all distinct and . Our main result for -paths is that the only non-trivial case that arises here is when . In that case, there are essentially only two possible dual pairs of -flexipaths when .
Keywords
Cite
@article{arxiv.2405.15207,
title = {Clonal cores and flexipaths in matroids},
author = {Nick Brettell and James Oxley and Charles Semple and Geoff Whittle},
journal= {arXiv preprint arXiv:2405.15207},
year = {2025}
}
Comments
42 pages, 3 figures