Titlebook: Nearrings and Nearfields; Proceedings of the C Hubert Kiechle,Alexander Kreuzer,Momme Johs Thomse Conference proceedings 2005 Springer Scie

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只看該作者 · 發(fā)表于 2025-3-21 23:55:06

Zero-Divisor Graphs of Nearrings and Semigroupse presented. All possible zero-divisor graphs of nearrings with identity in which the graph has less than five vertices are classified, and the additive group of each nonring is identified. Following the example of [7], we include a table of nearrings with identity of orders between sixteen and thirty-one.

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A Right Radical for Right D.G. Near-Ringsin near-rings with suitable chain conditions between .(.), the (left) radicals and the intersection of all maximal right ideals, denoted .(.). In particular we prove that .(.) = .(.) for near-rings . satisfying the descending chain condition for left .-subgroups of ..

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Some Recent Developments in Group Near-Ringsroup near-rings. We present here an account of some of the recent work on group near-rings, emphasizing the parallels with matrix near-rings and the most recent developments. Much of this work was done in collaboration with J. H. Meyer.

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The ,-Constrained Conjectures definition. A 3-tame nearing . has a unique maximal locally .-nilpotent right .-subgroup .(.). This right .-subgroup is an ideal. It is shown that if, for a compatible nearing . with .(.) is .-constrained, then all Fitting factors of faithful compatible .-groups are .-isomorphic. A number of other

只看該作者 · 發(fā)表于 2025-3-22 19:30:48

Zero-Divisor Graphs of Nearrings and Semigroupsly, these ideas have been adapted to semigroups by DeMeyer, McKenzie, and Schneider [10]. Results concerning the properties of graphs of semigroups are presented. All possible zero-divisor graphs of nearrings with identity in which the graph has less than five vertices are classified, and the additi

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