Factorisation of greedoid polynomials of rooted digraphs

Gordon and McMahon defined a two-variable greedoid polynomial f(G; t, z) for any greedoid G. They studied greedoid polynomials for greedoids associated with rooted graphs and rooted digraphs. They proved that greedoid polynomials of rooted digraphs have the multiplicative direct sum property. In add...

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Main Authors: Yow, Kai Siong, Morgan, Kerri, Farr, Graham
Format: Article
Published: Springer 2021
Online Access:http://psasir.upm.edu.my/id/eprint/97264/
https://link.springer.com/article/10.1007/s00373-021-02347-0
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spelling my.upm.eprints.972642024-08-19T02:07:11Z http://psasir.upm.edu.my/id/eprint/97264/ Factorisation of greedoid polynomials of rooted digraphs Yow, Kai Siong Morgan, Kerri Farr, Graham Gordon and McMahon defined a two-variable greedoid polynomial f(G; t, z) for any greedoid G. They studied greedoid polynomials for greedoids associated with rooted graphs and rooted digraphs. They proved that greedoid polynomials of rooted digraphs have the multiplicative direct sum property. In addition, these polynomials are divisible by 1 +Z under certain conditions. We compute the greedoid polynomials for all rooted digraphs up to order six. A polynomial is said to factorise if it has a non-constant factor of lower degree. We study the factorability of greedoid polynomials of rooted digraphs, particularly those that are not divisible by 1 + Z. We give some examples and an infinite family of rooted digraphs that are not direct sums but their greedoid polynomials factorise. Springer 2021-06-21 Article PeerReviewed Yow, Kai Siong and Morgan, Kerri and Farr, Graham (2021) Factorisation of greedoid polynomials of rooted digraphs. Graphs and Combinatorics, 37 (6). pp. 2245-2264. ISSN 0911-0119; EISSN: 1435-5914 https://link.springer.com/article/10.1007/s00373-021-02347-0 10.1007/s00373-021-02347-0
institution Universiti Putra Malaysia
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continent Asia
country Malaysia
content_provider Universiti Putra Malaysia
content_source UPM Institutional Repository
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description Gordon and McMahon defined a two-variable greedoid polynomial f(G; t, z) for any greedoid G. They studied greedoid polynomials for greedoids associated with rooted graphs and rooted digraphs. They proved that greedoid polynomials of rooted digraphs have the multiplicative direct sum property. In addition, these polynomials are divisible by 1 +Z under certain conditions. We compute the greedoid polynomials for all rooted digraphs up to order six. A polynomial is said to factorise if it has a non-constant factor of lower degree. We study the factorability of greedoid polynomials of rooted digraphs, particularly those that are not divisible by 1 + Z. We give some examples and an infinite family of rooted digraphs that are not direct sums but their greedoid polynomials factorise.
format Article
author Yow, Kai Siong
Morgan, Kerri
Farr, Graham
spellingShingle Yow, Kai Siong
Morgan, Kerri
Farr, Graham
Factorisation of greedoid polynomials of rooted digraphs
author_facet Yow, Kai Siong
Morgan, Kerri
Farr, Graham
author_sort Yow, Kai Siong
title Factorisation of greedoid polynomials of rooted digraphs
title_short Factorisation of greedoid polynomials of rooted digraphs
title_full Factorisation of greedoid polynomials of rooted digraphs
title_fullStr Factorisation of greedoid polynomials of rooted digraphs
title_full_unstemmed Factorisation of greedoid polynomials of rooted digraphs
title_sort factorisation of greedoid polynomials of rooted digraphs
publisher Springer
publishDate 2021
url http://psasir.upm.edu.my/id/eprint/97264/
https://link.springer.com/article/10.1007/s00373-021-02347-0
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