Abstract. The radical of a Morita ring has been determined explicitly in terms of the radicals of the underlying base rings for radical classes which satisfy certain conditions. Here we again look at the radicals of Morita rings. But, in order to describe the radical of such a ring in terms of the underlying base rings, we rather exploit certain structural properties of Morita rings and weaken the requirements on the radical class
The basic theme of the thesis is the development of a theory of radicals in a categorical setting. G...
AbstractThe Morita context which has been introduced in [9] was used since to prove Wedderburn theor...
A corner of a ring A is a subring eAe, where e is an idempotent. Radical and semi-simple classes whi...
Several aspects of the theory of radical classes in associative ring theory are investigated. In Ch...
"This research aims to refresh and reinterpret the radical theory of associative rings using the bas...
AbstractA radical N in the category of rings is called normal if, for any Morita context (R, V, W, S...
AbstractGeneralizing various concrete radicals in associative rings like the nilradical, the Jacobso...
If M is a homomorphically closed class of rings then there is a radical class LM, the lower ^-radica...
We examine the relationship between the radical of a ring and the radical of the associated splittin...
For a Kurosh–Amitsur radical class of rings, we investigate the existence, for a radical subring S o...
In this note, we introduce (hereditary) Amitsur rings and give examples of (hereditary) Amitsur ring...
This research is essentially an investigation into lower radical type construction and the consequen...
This thesis is a study of radical ideals in restricted domains of associative rings. The first cha...
A radical class R of rings is elementary if it contains precisely those rings whose singly generated...
We show that polynomial and multiplicative radicals in [1] are special cases of radicals defined by ...
The basic theme of the thesis is the development of a theory of radicals in a categorical setting. G...
AbstractThe Morita context which has been introduced in [9] was used since to prove Wedderburn theor...
A corner of a ring A is a subring eAe, where e is an idempotent. Radical and semi-simple classes whi...
Several aspects of the theory of radical classes in associative ring theory are investigated. In Ch...
"This research aims to refresh and reinterpret the radical theory of associative rings using the bas...
AbstractA radical N in the category of rings is called normal if, for any Morita context (R, V, W, S...
AbstractGeneralizing various concrete radicals in associative rings like the nilradical, the Jacobso...
If M is a homomorphically closed class of rings then there is a radical class LM, the lower ^-radica...
We examine the relationship between the radical of a ring and the radical of the associated splittin...
For a Kurosh–Amitsur radical class of rings, we investigate the existence, for a radical subring S o...
In this note, we introduce (hereditary) Amitsur rings and give examples of (hereditary) Amitsur ring...
This research is essentially an investigation into lower radical type construction and the consequen...
This thesis is a study of radical ideals in restricted domains of associative rings. The first cha...
A radical class R of rings is elementary if it contains precisely those rings whose singly generated...
We show that polynomial and multiplicative radicals in [1] are special cases of radicals defined by ...
The basic theme of the thesis is the development of a theory of radicals in a categorical setting. G...
AbstractThe Morita context which has been introduced in [9] was used since to prove Wedderburn theor...
A corner of a ring A is a subring eAe, where e is an idempotent. Radical and semi-simple classes whi...