Add to ORKGSome conjectures related to the radical theory of rings are still open. Hence, the research on the radical theory of rings is still being investigated by some prominent authors. On the other hand, some results on the radical theory of rings can be implemented in another branch or structure. In radical theory, it is interesting to bring some radical classes into graded versions. In this chance, we implement a qualitative method to conduct the research to bring the Brown-McCoy radical class to the restricted graded Brown-McCoy radical class as research objective. We start from some known facts on the Brown-McCoy radical class and furthermore, let G be a group, we explain the Brown-McCoy radical restricted with respect to the group G. The resu...
We establish some results on the structure of the geometric unipotent radicals of pseudo-reductive k...
Abstract. The radical of a Morita ring has been determined explicitly in terms of the radicals of th...
We show that polynomial and multiplicative radicals in [1] are special cases of radicals defined by ...
Some conjectures related to the radical theory of rings are still open. Hence, the research on the r...
This thesis is a study of radical ideals in restricted domains of associative rings. The first cha...
Abstract. In this paper we explore the properties of being hereditary and being strong among the rad...
Abstract Unavailable at this time...Mathematics Subject Classification (2000): Primary: 16Y30; Secon...
Abstract. The development of Ring Theory motivates the existence of the development of the Radical T...
AbstractThis paper contains a number of observations on the semisimplicity problem for group rings w...
A prime ring A is called a ∗−ring if β(A/I) = A/I for every nonzero ideal proper I of A, where β is...
In this paper we explore the properties of being hereditary and being strong among the radicals of a...
This research is essentially an investigation into lower radical type construction and the consequen...
For a Kurosh–Amitsur radical class of rings, we investigate the existence, for a radical subring S o...
If M is a homomorphically closed class of rings then there is a radical class LM, the lower ^-radica...
AbstractUntil very recently, the only known ideal-hereditary radicals in the variety of o-symmetric ...
We establish some results on the structure of the geometric unipotent radicals of pseudo-reductive k...
Abstract. The radical of a Morita ring has been determined explicitly in terms of the radicals of th...
We show that polynomial and multiplicative radicals in [1] are special cases of radicals defined by ...
Some conjectures related to the radical theory of rings are still open. Hence, the research on the r...
This thesis is a study of radical ideals in restricted domains of associative rings. The first cha...
Abstract. In this paper we explore the properties of being hereditary and being strong among the rad...
Abstract Unavailable at this time...Mathematics Subject Classification (2000): Primary: 16Y30; Secon...
Abstract. The development of Ring Theory motivates the existence of the development of the Radical T...
AbstractThis paper contains a number of observations on the semisimplicity problem for group rings w...
A prime ring A is called a ∗−ring if β(A/I) = A/I for every nonzero ideal proper I of A, where β is...
In this paper we explore the properties of being hereditary and being strong among the radicals of a...
This research is essentially an investigation into lower radical type construction and the consequen...
For a Kurosh–Amitsur radical class of rings, we investigate the existence, for a radical subring S o...
If M is a homomorphically closed class of rings then there is a radical class LM, the lower ^-radica...
AbstractUntil very recently, the only known ideal-hereditary radicals in the variety of o-symmetric ...
We establish some results on the structure of the geometric unipotent radicals of pseudo-reductive k...
Abstract. The radical of a Morita ring has been determined explicitly in terms of the radicals of th...
We show that polynomial and multiplicative radicals in [1] are special cases of radicals defined by ...