DERIVATIONS OF THE LOCALLY NILPOTENT MATRIX RINGS

被引:8
|
作者
Levchuk, Vladimir M. [1 ]
Radchenko, Oksana V. [1 ]
机构
[1] Siberian Fed Univ, Inst Math, Krasnoyarsk 660041, Russia
来源
JOURNAL OF ALGEBRA AND ITS APPLICATIONS | 2010年 / 9卷 / 05期
关键词
Finitary niltriangular matrix; associated Jordan ring; Lie ring; derivation; JORDAN DERIVATIONS; LIE IDEALS; AUTOMORPHISMS; ISOMORPHISMS; ALGEBRA;
D O I
10.1142/S0219498810004154
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
Derivations of the ring of all finitary niltriangular matrices over an arbitrary associative ring with identity for any chain of matrix indices are described. Every Lie or Jordan derivation is a derivation of this ring modulo third hypercenter.
引用
收藏
页码:717 / 724
页数:8
相关论文
共 50 条
  • [1] ON RINGS WITH LOCALLY NILPOTENT SKEW DERIVATIONS
    Bergen, Jeffrey
    Grzeszczuk, Piotr
    [J]. COMMUNICATIONS IN ALGEBRA, 2011, 39 (10) : 3698 - 3708
  • [2] Locally nilpotent derivations and the structure of rings
    Daigle, Daniel
    [J]. JOURNAL OF PURE AND APPLIED ALGEBRA, 2019, 224 (04)
  • [3] On locally nilpotent derivations of Fermat rings
    Brumatti, Paulo Roberto
    Veloso, Marcelo Oliveira
    [J]. ALGEBRA & DISCRETE MATHEMATICS, 2013, 16 (01): : 20 - 32
  • [4] Locally nilpotent derivations of polynomial rings
    Pakovich, FB
    [J]. MATHEMATICAL NOTES, 1995, 58 (1-2) : 890 - 891
  • [5] ON DIFFERENTIAL POLYNOMIAL RINGS WITH LOCALLY NILPOTENT DERIVATIONS
    Shin, Jooyoung
    [J]. arXiv, 2023,
  • [6] Locally Nilpotent Derivations of Rings with Roots Adjoined
    Freudenburg, Gene
    Moser-Jauslin, Lucy
    [J]. MICHIGAN MATHEMATICAL JOURNAL, 2013, 62 (02) : 227 - 258
  • [7] Locally nilpotent derivations of rings graded by an abelian group
    Daigle, Daniel
    Freudenburg, Gene
    Moser-Jauslin, Lucy
    [J]. ALGEBRAIC VARIETIES AND AUTOMORPHISM GROUPS, 2017, 75 : 29 - 48
  • [8] Jordan τ-Derivations of Locally Matrix Rings
    Chen-Lian Chuang
    Ajda Fošner
    Tsiu-Kwen Lee
    [J]. Algebras and Representation Theory, 2013, 16 : 755 - 763
  • [9] Jordan τ-Derivations of Locally Matrix Rings
    Chuang, Chen-Lian
    Fosner, Ajda
    Lee, Tsiu-Kwen
    [J]. ALGEBRAS AND REPRESENTATION THEORY, 2013, 16 (03) : 755 - 763
  • [10] ON NILPOTENT DERIVATIONS OF SEMIPRIME RINGS
    GRZESZCZUK, P
    [J]. JOURNAL OF ALGEBRA, 1992, 149 (02) : 313 - 321
12345