Add to ORKGAbstract. A well-known theorem of Jacobson (1964, page 217) asserts that a ring R with the property that, for each x in R, there exists an integer n(x)> 1 such that xn(x) = x is necessarily commutative. This theorem is generalized to the case of a weakly periodic ring R with a “sufficient ” number of potent extended commutators. A ring R is called weakly periodic if every x in R can be written in the form x = a+b, where a is nilpotent and b is “potent ” in the sense that bn(b) = b for some integer n(b)> 1. It is shown that a weakly periodic ring R in which certain extended commutators are potent must have a nil commutator ideal and, moreover, the set N of nilpotents forms an ideal which, in fact, coincides with the Jacobson radical ...
The study of certain series of groups has greatly aided the development and understanding of group t...
ABSTRACT. A well-known theorem of Jacobson asserts that a ring R in which x n(x)=- x, for every x in...
ABSTRACT. Let R be a ring (not necessarily with identity), N the set of nilpotents, and n> a fixe...
Abstract. A well-known theorem of Jacobson (1964, page 217) asserts that a ring R with the property ...
A well-known theorem of Jacobson (1964, page 217) asserts that a ring R with the property that, for ...
Abstract. A ring R is called periodic if, for every x in R, there exist distinct positive integers m...
A ring is called semi-weakly periodic if each element which is not in the center or the Jacobson rad...
A ring is called semi-weakly periodic if each element which is not in the center or the Jacobson rad...
A ring is called semi-weakly periodic if each element which is not in the center or the Jacobson rad...
Let R denote a ring with center Z, and let N be the set of nilpotent elements. We consider rings def...
Let R be a ring with center Z, Jacobson radical J, and set N of all nilpotent elements. Call R gener...
Let R be a ring with center Z, Jacobson radical J, and set N of all nilpotent elements. Call R gener...
Let R be a ring such that every zero divisor x is expressible as a sum of a nilpotent element and a ...
Abstract. We prove that a generalized periodic, as well as a generalized Boolean, ring is either com...
Abstract. We prove that a generalized periodic, as well as a generalized Boolean, ring is either com...
The study of certain series of groups has greatly aided the development and understanding of group t...
ABSTRACT. A well-known theorem of Jacobson asserts that a ring R in which x n(x)=- x, for every x in...
ABSTRACT. Let R be a ring (not necessarily with identity), N the set of nilpotents, and n> a fixe...
Abstract. A well-known theorem of Jacobson (1964, page 217) asserts that a ring R with the property ...
A well-known theorem of Jacobson (1964, page 217) asserts that a ring R with the property that, for ...
Abstract. A ring R is called periodic if, for every x in R, there exist distinct positive integers m...
A ring is called semi-weakly periodic if each element which is not in the center or the Jacobson rad...
A ring is called semi-weakly periodic if each element which is not in the center or the Jacobson rad...
A ring is called semi-weakly periodic if each element which is not in the center or the Jacobson rad...
Let R denote a ring with center Z, and let N be the set of nilpotent elements. We consider rings def...
Let R be a ring with center Z, Jacobson radical J, and set N of all nilpotent elements. Call R gener...
Let R be a ring with center Z, Jacobson radical J, and set N of all nilpotent elements. Call R gener...
Let R be a ring such that every zero divisor x is expressible as a sum of a nilpotent element and a ...
Abstract. We prove that a generalized periodic, as well as a generalized Boolean, ring is either com...
Abstract. We prove that a generalized periodic, as well as a generalized Boolean, ring is either com...
The study of certain series of groups has greatly aided the development and understanding of group t...
ABSTRACT. A well-known theorem of Jacobson asserts that a ring R in which x n(x)=- x, for every x in...
ABSTRACT. Let R be a ring (not necessarily with identity), N the set of nilpotents, and n> a fixe...