Saved in:
Bibliographic Details
Main Authors: Bowler, Nathan, Funk, Daryl, Slilaty, Daniel
Format: Preprint
Published: 2018
Subjects:
Online Access:https://arxiv.org/abs/1808.00489
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866908380370567168
author Bowler, Nathan
Funk, Daryl
Slilaty, Daniel
author_facet Bowler, Nathan
Funk, Daryl
Slilaty, Daniel
contents This is a revised version of our original paper (arXiv:1808.00489v2) incorporating the corrections published in a corrigendum (arXiv:1808.00489v3). Our main theorem as originally stated was missing the required assumption that matroids should be connected. Those unfamiliar with the original paper will find in this version a complete, correct description of quasi-graphic matroids, sparing them the inconvenience of having to read both the original paper and a separate corrigendum. We also present here some new results that do not appear in our original paper nor its corrigendum. These appear in Section 6. Of particular interest to readers familiar with the original paper and its corrigendum may be the following result. Given a matroid and a graph, of the four axioms for quasi-graphic matroids, three may be checked in time polynomial in the size of the ground set, but the fourth axiom in general cannot. It is desirable to have such a check that could be carried out in polynomial time. We provide such an alternative (Theorem 6.20).
format Preprint
id arxiv_https___arxiv_org_abs_1808_00489
institution arXiv
publishDate 2018
record_format arxiv
spellingShingle Describing Quasi-Graphic Matroids
Bowler, Nathan
Funk, Daryl
Slilaty, Daniel
Combinatorics
This is a revised version of our original paper (arXiv:1808.00489v2) incorporating the corrections published in a corrigendum (arXiv:1808.00489v3). Our main theorem as originally stated was missing the required assumption that matroids should be connected. Those unfamiliar with the original paper will find in this version a complete, correct description of quasi-graphic matroids, sparing them the inconvenience of having to read both the original paper and a separate corrigendum. We also present here some new results that do not appear in our original paper nor its corrigendum. These appear in Section 6. Of particular interest to readers familiar with the original paper and its corrigendum may be the following result. Given a matroid and a graph, of the four axioms for quasi-graphic matroids, three may be checked in time polynomial in the size of the ground set, but the fourth axiom in general cannot. It is desirable to have such a check that could be carried out in polynomial time. We provide such an alternative (Theorem 6.20).
title Describing Quasi-Graphic Matroids
topic Combinatorics
url https://arxiv.org/abs/1808.00489