Add to ORKGWe introduce a relativized notion of (semi)normalcy for categories that come equipped with a proper stable factorization system, and we use radicals (in the sense of module theory) and normal closure operators in order to study torsion theories in such categories. Our results generalize and complement recent studies in the realm of semi-abelian and, in part, homological categories. In particular, we characterize both, torsion-free and torsion classes, in terms of their closure under extensions. We pay particular attention to the homological and, for our purposes more importantly, normal categories of topological algebra, such as the category of topological groups. But our applications go far beyond the realm of these types of categories, as...
In 2002 G. Janelidze, L. Márki and W. Tholen introduced semi-abelian categories. These categories pr...
The subject matter of this thesis has its origins in Dickson's generalization to certain abelian ca...
Observing that weak heredity of regular closure operators in Top and of homological closure operator...
We introduce a relativized notion of (semi)normalcy for categories that come equipped with a proper ...
AbstractWe introduce a relativized notion of (semi)normalcy for categories that come equipped with a...
We introduce a relativized notion of (semi)normalcy for categories that come equipped with a proper ...
We introduce and study the notion of torsion theory in the non-abelian context of homological catego...
AbstractWe introduce and study the notion of torsion theory in the non-abelian context of homologica...
Torsion theories were originally introduced by D. Dickson to study abelian categories, and in partic...
AbstractWe introduce and study the notion of torsion theory in the non-abelian context of homologica...
The subject matter of this thesis has its origins in Dickson's generalization to certain abelian ca...
The subject matter of this thesis has its origins in Dickson's generalization to certain abelian ca...
For any torsion theory in a homological category, one can define a categorical Galois structure and ...
We characterize $t$-structures in stable $\infty$-categories as suitable quasicategorical factorizat...
Given a torsion theory (T, F) in an abelian category C, the reflector I : C → F to the torsion-free ...
In 2002 G. Janelidze, L. Márki and W. Tholen introduced semi-abelian categories. These categories pr...
The subject matter of this thesis has its origins in Dickson's generalization to certain abelian ca...
Observing that weak heredity of regular closure operators in Top and of homological closure operator...
We introduce a relativized notion of (semi)normalcy for categories that come equipped with a proper ...
AbstractWe introduce a relativized notion of (semi)normalcy for categories that come equipped with a...
We introduce a relativized notion of (semi)normalcy for categories that come equipped with a proper ...
We introduce and study the notion of torsion theory in the non-abelian context of homological catego...
AbstractWe introduce and study the notion of torsion theory in the non-abelian context of homologica...
Torsion theories were originally introduced by D. Dickson to study abelian categories, and in partic...
AbstractWe introduce and study the notion of torsion theory in the non-abelian context of homologica...
The subject matter of this thesis has its origins in Dickson's generalization to certain abelian ca...
The subject matter of this thesis has its origins in Dickson's generalization to certain abelian ca...
For any torsion theory in a homological category, one can define a categorical Galois structure and ...
We characterize $t$-structures in stable $\infty$-categories as suitable quasicategorical factorizat...
Given a torsion theory (T, F) in an abelian category C, the reflector I : C → F to the torsion-free ...
In 2002 G. Janelidze, L. Márki and W. Tholen introduced semi-abelian categories. These categories pr...
The subject matter of this thesis has its origins in Dickson's generalization to certain abelian ca...
Observing that weak heredity of regular closure operators in Top and of homological closure operator...