The \(p\)–gen nature of \(M_0(V)\) (I)
Let \( V \) be a finite group (not elementary two) and \( p\geq 5 \) a prime. The question as to when the nearring \( M_0(V) \) of all zero-fixing self-maps on \( V \) is generated by a unit of order \( p \) is difficult. In this paper we show \( M_0(V) \) is so generated if and only if \( V \) do...
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| Дата: | 2018 |
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| Автор: | |
| Формат: | Стаття |
| Мова: | English |
| Опубліковано: |
Lugansk National Taras Shevchenko University
2018
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| Теми: | |
| Онлайн доступ: | https://admjournal.luguniv.edu.ua/index.php/adm/article/view/746 |
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| Назва журналу: | Algebra and Discrete Mathematics |
Репозитарії
Algebra and Discrete Mathematics| Резюме: | Let \( V \) be a finite group (not elementary two) and \( p\geq 5 \) a prime. The question as to when the nearring \( M_0(V) \) of all zero-fixing self-maps on \( V \) is generated by a unit of order \( p \) is difficult. In this paper we show \( M_0(V) \) is so generated if and only if \( V \) does not belong to one of three finite disjoint families \( {\cal D}^\#(1,p) \) (=\( {\cal D}(1,p)\cup\{\{0\}\}) \), \( {\cal D}(2,p) \) and \( {\cal D}(3,p) \) of groups, where \( {\cal D}(n,p) \) are those groups \( G \) (not elementary two) with \( |G|\leq np \) and \( \delta(G)>(n-1)p \) (see [1] or §.1 for the definition of \(\delta(G) \)). |
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