Describing ring varieties in which all finite rings have Hamiltonian zero-divisor graphs

被引:0
|
作者
Yu. N. Mal’tsev
A. S. Kuz’mina
机构
[1] Altai State Pedagogical Academy,
[2] Altai State Pedagogical Academy,undefined
来源
Algebra and Logic | 2013年 / 52卷
关键词
zero-divisor graph; Hamiltonian graph; variety of associative rings; finite ring;
D O I
暂无
中图分类号
学科分类号
摘要
The zero-divisor graph of an associative ring R is a graph such that its vertices are all nonzero (one-sided and two-sided) zero-divisors, and moreover, two distinct vertices x and y are joined by an edge iff xy = 0 or yx = 0. We give a complete description of varieties of associative rings in which all finite rings have Hamiltonian zero-divisor graphs. Also finite decomposable rings with unity having Hamiltonian zero-divisor graphs are characterized.
引用
下载
收藏
页码:137 / 146
页数:9
相关论文
共 50 条
  • [31] ON THE CENTER OF ZERO-DIVISOR AND IDEAL-DIVISOR GRAPHS OF FINITE COMMUTATIVE RINGS
    Bloome, Lane
    Peck, Hailee
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2014, 13 (05)
  • [32] COMMUTATIVE RINGS WHOSE ZERO-DIVISOR GRAPHS HAVE POSITIVE GENUS
    Aliniaeifard, F.
    Behboodi, M.
    COMMUNICATIONS IN ALGEBRA, 2013, 41 (10) : 3629 - 3634
  • [33] On diameter of the zero-divisor and the compressed zero-divisor graphs of skew Laurent polynomial rings
    Hashemi, Ebrahim
    Abdi, Mona
    Alhevaz, Abdollah
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2019, 18 (07)
  • [34] Compressed zero-divisor graphs of matrix rings over finite fields
    Duric, Alen
    Jevdenic, Sara
    Stopar, Nik
    LINEAR & MULTILINEAR ALGEBRA, 2021, 69 (11): : 2012 - 2039
  • [35] Compressed and Partially Compressed Zero-Divisor Graphs of Finite Associative Rings
    A. A. Afanas’ev
    A. S. Monastyreva
    Siberian Mathematical Journal, 2023, 64 : 291 - 299
  • [36] Rings in which every left zero-divisor is also a right zero-divisor and conversely
    Ghashghaei, E.
    Kosan, M. Tamer
    Namdari, M.
    Yildirim, T.
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2019, 18 (05)
  • [37] Classification of rings with projective zero-divisor graphs
    Chiang-Hsieh, Hung-Jen
    JOURNAL OF ALGEBRA, 2008, 319 (07) : 2789 - 2802
  • [38] On Domination of Zero-divisor Graphs of Matrix Rings
    Jafari, Sayyed Heidar
    Rad, Nader Jafari
    CANADIAN MATHEMATICAL BULLETIN-BULLETIN CANADIEN DE MATHEMATIQUES, 2015, 58 (02): : 271 - 275
  • [39] COMMUTATIVE RINGS WITH TOROIDAL ZERO-DIVISOR GRAPHS
    Chiang-Hsieh, Hung-Jen
    Smith, Neal O.
    Wang, Hsin-Ju
    HOUSTON JOURNAL OF MATHEMATICS, 2010, 36 (01): : 1 - 31
  • [40] Categorial properties of compressed zero-divisor graphs of finite commutative rings
    Duric, Alen
    Jevdenic, Sara
    Stopar, Nik
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2021, 20 (05)
12345