期刊文献+
共找到7篇文章
< 1 >
每页显示 20 50 100
An Introduction to the Theory of Matrix Near-Rings
1
作者 Saviour Chibeti Iness Kyapwanyama 《Advances in Pure Mathematics》 2023年第2期71-95,共25页
Matrix rings are prominent in abstract algebra. In this paper we give an overview of the theory of matrix near-rings. A near-ring differs from a ring in that it does not need to be abelian and one of the distributive ... Matrix rings are prominent in abstract algebra. In this paper we give an overview of the theory of matrix near-rings. A near-ring differs from a ring in that it does not need to be abelian and one of the distributive laws does not hold in general. We introduce two ways in which matrix near-rings can be defined and discuss the structure of each. One is as given by Beildeman and the other is as defined by Meldrum. Beildeman defined his matrix near-rings as normal arrays under the operation of matrix multiplication and addition. He showed that we have a matrix near-ring over a near-ring if, and only if, it is a ring. In this case it is not possible to obtain a matrix near-ring from a proper near-ring. Later, in 1986, Meldrum and van der Walt defined matrix near-rings over a near-ring as mappings from the direct sum of n copies of the additive group of the near-ring to itself. In this case it can be shown that a proper near-ring is obtained. We prove several properties, introduce some special matrices and show that a matrix notation can be introduced to make calculations easier, provided that n is small. 展开更多
关键词 near-rings First near-ring Isomorphism Zero Symmetric near-ring near-ring Module and Matrix near-rings
下载PDF
Generalized fuzzy ideals of near-rings 被引量:1
2
作者 ZHAN Jian-ming Davvaz B. 《Applied Mathematics(A Journal of Chinese Universities)》 SCIE CSCD 2009年第3期343-349,共7页
The concept of(∈,∈∨q)-fuzzy subnear-rings(ideals) of a near-ring is introduced and some of its related properties are investigated.In particular,the relationships among ordinary fuzzy subnear-rings(ideals),(... The concept of(∈,∈∨q)-fuzzy subnear-rings(ideals) of a near-ring is introduced and some of its related properties are investigated.In particular,the relationships among ordinary fuzzy subnear-rings(ideals),(∈,∈∨ q)-fuzzy subnear-rings(ideals) and(∈,∈∨q)-fuzzy subnear-rings(ideals) of near-rings are described.Finally,some characterization of [μ]t is given by means of(∈,∈∨ q)-fuzzy ideals. 展开更多
关键词 near-rING subnear-ring (ideal) (∈ q)-fuzzy subnear-ring (ideal) (∈ ∈∨ q)-fuzzy subnear-ring(ideal)
下载PDF
Redefined generalized fuzzy ideals of near-rings 被引量:1
3
作者 ZHAN Jian-ming YIN Yun-qiang 《Applied Mathematics(A Journal of Chinese Universities)》 SCIE CSCD 2010年第3期341-348,共8页
With a new idea, we redefine generalized fuzzy subnear-rings (ideals) of a near- ring and investigate some of its related properties. Some new characterizations are given. In particular, we introduce the concepts of... With a new idea, we redefine generalized fuzzy subnear-rings (ideals) of a near- ring and investigate some of its related properties. Some new characterizations are given. In particular, we introduce the concepts of strong prime (or semiprime) (∈, ∈∨ q)-fuzzy ideals of near-rings, and discuss the relationship between strong prime (or semiprime) (∈, ∈∨ q)-fuzzy ideals and prime (or semiprime) (∈, ∈∨ q)-fuzzy ideals of near-rings. 展开更多
关键词 near-rING subnear-ring (ideal) (∈^- ∈^-∨ q^-)-fuzzy subnear-ring (ideal) prime (semiprime) (∈ ∈∨ q)-fuzzy subnear-ring (ideal).
下载PDF
Commutativity of Near-rings with Derivations 被引量:1
4
作者 Ahmed A.M. Kamal Khalid H. AI-Shaalan 《Algebra Colloquium》 SCIE CSCD 2014年第2期215-230,共16页
In this paper we first prove that a near-ring admits a derivation if and only if it is zero-symmetric. Also, we prove some commutativity theorems for a non-necessarily 3-prime near-ring R with a suitably-constrained d... In this paper we first prove that a near-ring admits a derivation if and only if it is zero-symmetric. Also, we prove some commutativity theorems for a non-necessarily 3-prime near-ring R with a suitably-constrained derivation d satisfying the condition that d(a) is not a left zero-divisor in R for some a ∈ R. As consequences, we generalize several commutativity theorems for 3-prime near-rings admitting derivations. 展开更多
关键词 near-rings DERIVATIONS 3-prime near-ring non-left zero-divisors commuta-tivity of near-rings
原文传递
Authenticated Group Key Agreement Protocol Based on Twist Conjugacy Problem in Near-Rings
5
作者 Devarasan Ezhilmaran Venkatesan Muthukumaran 《Wuhan University Journal of Natural Sciences》 CAS CSCD 2017年第6期472-476,共5页
Nowadays some promising authenticated group key agreement protocols are constructed on braid groups, dynamic groups, pairings and bilinear pairings. Hence the non-abelian structure has attracted cryptographers to cons... Nowadays some promising authenticated group key agreement protocols are constructed on braid groups, dynamic groups, pairings and bilinear pairings. Hence the non-abelian structure has attracted cryptographers to construct public-key cryptographic protocols. In this article, we propose a new authenticated group key agreement protocol which works in non-abelian near-rings. We have proved that our protocol meets the security attributes under the assumption that the twist conjugacy search problem(TCSP) is hard in near-ring. 展开更多
关键词 group key agreement protocol near-rings twist conjugacy search problem
原文传递
A Note on the Commutativity of Prime Near-rings 被引量:1
6
作者 Yilun Shang 《Algebra Colloquium》 SCIE CSCD 2015年第3期361-366,共6页
Let N be a prime near-ring. We show two main results on the commutativity of N: (1) If there exist k, l ∈ N such that N admits a generalized derivation D satisfying either D([x,y]) = xk[x,y]xl for all x,y ∈ N o... Let N be a prime near-ring. We show two main results on the commutativity of N: (1) If there exist k, l ∈ N such that N admits a generalized derivation D satisfying either D([x,y]) = xk[x,y]xl for all x,y ∈ N or D([x,y]) = -xk[x,y]xI for all x,y ∈ N, then N is a commutative ring. (2) If there exist k, l ∈ N such that N admits a generalized derivation D satisfying either D(x o y) = xk(x o y)xl for all x, y ∈ N or D(x o y) = -xk(x o y)xl for all x, y ∈ N, then N is a commutative ring. Moreover, some interesting relations between the prime graph and zero-divisor graph of N are studied. 展开更多
关键词 near-rING DERIVATION prime graph
原文传递
An Application of Linear Automata to Near Rings
7
作者 Songfa You Yijun Feng +1 位作者 Ming Cao Yaping Wei 《Applied Mathematics》 2012年第11期1614-1618,共5页
In this paper , we have established an intimate connection between near-nings and linear automata,and obtain the following results: 1) For a near-ring N there exists a linear GSA S with N ≌ N(S) iff (a) (N, +) is abe... In this paper , we have established an intimate connection between near-nings and linear automata,and obtain the following results: 1) For a near-ring N there exists a linear GSA S with N ≌ N(S) iff (a) (N, +) is abelian, (b) N has an identity 1, (c) There is some d ∈ Nd such that N0 is generated by {1,d};2) Let h: S → S’ be a GSA- epimorphism. Then there exists a near-ring epimorphism from N(S) to N(S’) with h(qn) = h(q)h(n) for all q ∈ Q and n ∈ N(S);3) Let A = (Q,A,B,F,G) be a GA. Then (a) Aa:=(Q(N(A)) =: Qa,A,B,F/Qa × A) is accessible, (b) Q = 0N(A), (c) A/~:= (Q/~,A,B,F~), Q~) with F^([q], a):= [F(q,a)] and G^([q], a):= G(q,a) is reduced, (d) Aa/~ is minimal. 展开更多
关键词 LINEAR AUTOMATA Accessible GSA-Homomorphism near-rING
下载PDF
上一页 1 下一页 到第
使用帮助 返回顶部