AbstractAn associative ring R without unity is called radical if it coincides with its Jacobson radical, which means that the set of all elements of R forms a group denoted by R∘ under the circle operation r∘s=r+s+rs on R. It is proved that, for a radical ring R, the group R∘ satisfies an n-Engel condition for some positive integer n if and only if R is m-Engel as a Lie ring for some positive integer m depending only on n
Ringel CM. On radical square zero rings. Algebra and discrete mathematics. 2012;14(2):297-306
Abstract. In this paper we explore the properties of being hereditary and being strong among the rad...
This research is essentially an investigation into lower radical type construction and the consequen...
AbstractAn associative ring R without unity is called radical if it coincides with its Jacobson radi...
AbstractAn associative ring R, not necessarily with an identity, is called radical if it coincides w...
An associative ring R, not necessarily with an identity, is called radical if it coincides with its ...
AbstractThe set of all elements of an associative ring R, not necessarily with a unit element, forms...
This thesis is a study of certain Engel conditions. First, we will define the set of all the X-rela...
AbstractGeneralizing various concrete radicals in associative rings like the nilradical, the Jacobso...
AbstractThis paper contains a number of observations on the semisimplicity problem for group rings w...
summary:A method due to Fay and Walls for associating a factorization system with a radical is exami...
Several aspects of the theory of radical classes in associative ring theory are investigated. In Ch...
AbstractAn associative ring R can be viewed as a semigroup via a∘b=a+b+ab, and as a Lie ring via [a,...
Let \(\alpha\) be any radical of associative rings. A radical \(\gamma\) is called \(\alpha\)-like i...
A radical class R of rings is elementary if it contains precisely those rings whose singly generated...
Ringel CM. On radical square zero rings. Algebra and discrete mathematics. 2012;14(2):297-306
Abstract. In this paper we explore the properties of being hereditary and being strong among the rad...
This research is essentially an investigation into lower radical type construction and the consequen...
AbstractAn associative ring R without unity is called radical if it coincides with its Jacobson radi...
AbstractAn associative ring R, not necessarily with an identity, is called radical if it coincides w...
An associative ring R, not necessarily with an identity, is called radical if it coincides with its ...
AbstractThe set of all elements of an associative ring R, not necessarily with a unit element, forms...
This thesis is a study of certain Engel conditions. First, we will define the set of all the X-rela...
AbstractGeneralizing various concrete radicals in associative rings like the nilradical, the Jacobso...
AbstractThis paper contains a number of observations on the semisimplicity problem for group rings w...
summary:A method due to Fay and Walls for associating a factorization system with a radical is exami...
Several aspects of the theory of radical classes in associative ring theory are investigated. In Ch...
AbstractAn associative ring R can be viewed as a semigroup via a∘b=a+b+ab, and as a Lie ring via [a,...
Let \(\alpha\) be any radical of associative rings. A radical \(\gamma\) is called \(\alpha\)-like i...
A radical class R of rings is elementary if it contains precisely those rings whose singly generated...
Ringel CM. On radical square zero rings. Algebra and discrete mathematics. 2012;14(2):297-306
Abstract. In this paper we explore the properties of being hereditary and being strong among the rad...
This research is essentially an investigation into lower radical type construction and the consequen...
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