Document Details

Document Type : Article In Journal 
Document Title :
On commutativity of rings involving certain polynomial constraints
On commutativity of rings involving certain polynomial constraints
 
Document Language : Arabic 
Abstract : Let m greater than or equal to 0 and n > 1 be fixed integers. Let R be a ring with unity 1 satisfying the condition that, for every y in R, there exist polynomials f(x) epsilon X(2)Z[X] and g(X), h(X) epsilon Z[X] depending on y such that x(m)[x(n),y] = g(y)[x, f(y)]h(y) for all a in R. The main result of the present paper asserts that R is commutative if R has the property Q(n), i.e., for all x,y in R, n[a,y] = 9 implies [x,y] = 0. 
Journal Name : ALGEBRA COLLOQUIUM 
Volume : 5 
Issue Number : 1 
Publishing Year : 1998 AH  
Added Date : Saturday, June 14, 2008 

Researchers

Researcher Name (Arabic)Researcher Name (English)Researcher TypeDr GradeEmail
حمزة علي أبو جبلAbujabal HASResearcher  

Download This Page

Back To Researches Page