Congruence-Simple Semirings

被引:0
|
作者
Robert El Bashir
Tomas Kepka
机构
[1] MFF UK,
[2] Sokolovska 83,undefined
来源
Semigroup Forum | 2007年 / 75卷
关键词
Unit Element; Prime Order; Division Ring; Neutral Element; Matrix Ring;
D O I
暂无
中图分类号
学科分类号
摘要
Several classes of congruence-simple semirings are characterized and various further examples are constructed. Among others, it is shown that every congruence-simple semiring fits into one of the following three classes: additively idempotent semirings, additively cancellative semirings, additively nil-semirings of index 2.
引用
收藏
页码:588 / 608
页数:20
相关论文
共 50 条
  • [11] One very particular example of a congruence-simple semiring
    Flaska, Vaclav
    [J]. EUROPEAN JOURNAL OF COMBINATORICS, 2009, 30 (04) : 759 - 763
  • [12] Cryptanalysis of a key exchange protocol based on a congruence-simple semiring action
    Sanchez, A. Otero
    Ramos, J. A. Lopez
    [J]. JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2024,
  • [13] SOFT CONGRUENCE RELATIONS OVER SEMIRINGS
    Breikhna
    Hussain, Fawad
    Hila, Kostaq
    Yaqoob, Naveed
    Rahim, Mohammad Tariq
    [J]. HONAM MATHEMATICAL JOURNAL, 2021, 43 (01): : 1 - 16
  • [14] CONGRUENCE-FREE COMMUTATIVE SEMIRINGS
    MITCHELL, SS
    FENOGLIO, PB
    [J]. SEMIGROUP FORUM, 1988, 37 (01) : 79 - 91
  • [15] The congruence y* on quasi completely regular semirings
    Maity, S. K.
    Ghosh, R.
    [J]. ASIAN-EUROPEAN JOURNAL OF MATHEMATICS, 2022, 15 (02)
  • [16] Simple semirings with zero
    Kepka, Tomas
    Kortelainen, Juha
    Nemec, Petr
    [J]. JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2016, 15 (03)
  • [17] Simple commutative semirings
    El Bashir, R
    Hurt, J
    Jancarík, A
    Kepka, T
    [J]. JOURNAL OF ALGEBRA, 2001, 236 (01) : 277 - 306
  • [18] COMPLETELY SIMPLE SEMIRINGS
    GRILLET, PA
    [J]. NOTICES OF THE AMERICAN MATHEMATICAL SOCIETY, 1969, 16 (01): : 101 - &
  • [19] ON 0-SIMPLE SEMIRINGS, SEMIGROUP SEMIRINGS, AND 2 KINDS OF DIVISION SEMIRINGS
    WEINERT, HJ
    [J]. SEMIGROUP FORUM, 1984, 28 (1-3) : 313 - 333
  • [20] DIRECTLY DECOMPOSABLE IDEALS AND CONGRUENCE KERNELS OF COMMUTATIVE SEMIRINGS
    Chajda, Ivan
    Eigenthaler, Guenther
    Laenger, Helmut
    [J]. MISKOLC MATHEMATICAL NOTES, 2020, 21 (01) : 113 - 125
12345