The aim of this paper is to obtain the solvability of the word problem over congruence classes of complex reflection groups G24 and G7. To do that, we use Gröbner-Shirshov basis theory and get the normal form structure of elements of these group types. © 2019 World Scientific Publishing Company.
Eser Adı (dc.title) | Gröbner-Shirshov bases for congruence classes of complex reflection groups |
Yayın Türü (dc.type) | Makale |
Yazar/lar (dc.contributor.author) | ÖZALAN, Nurten Urlu |
Yazar/lar (dc.contributor.author) | WAZZAN, Suha Ahmad |
Yazar/lar (dc.contributor.author) | GÜZEL KARPUZ, Eylem |
DOI Numarası (dc.identifier.doi) | 10.1142/S1793557120400136 |
Atıf Dizini (dc.source.database) | Scopus |
Konu Başlıkları (dc.subject) | Complex Reflection Group |
Konu Başlıkları (dc.subject) | Gröbner–Shirshov Basis |
Konu Başlıkları (dc.subject) | Normal Form |
Konu Başlıkları (dc.subject) | Word Problem |
Yayıncı (dc.publisher) | World Scientific Publishing Co. Pte Ltd |
Yayın Tarihi (dc.date.issued) | 2019 |
Kayıt Giriş Tarihi (dc.date.accessioned) | 2020-08-07T12:49:52Z |
Açık Erişim tarihi (dc.date.available) | 2020-08-07T12:49:52Z |
Kaynak (dc.source) | Asian-European Journal of Mathematics |
ISSN (dc.identifier.issn) | 17935571 (ISSN) |
Özet (dc.description.abstract) | The aim of this paper is to obtain the solvability of the word problem over congruence classes of complex reflection groups G24 and G7. To do that, we use Gröbner-Shirshov basis theory and get the normal form structure of elements of these group types. © 2019 World Scientific Publishing Company. |
Yayın Dili (dc.language.iso) | en |
Tek Biçim Adres (dc.identifier.uri) | http://hdl.handle.net/20.500.12498/2744 |