AbstractWe give a unified treatment of the Baer sums in the context of efficiently homological categories which, on the one hand, contains any category of groups with multiple operators and more generally any semi-abelian variety and, on the other hand, the category of Hausdorff groups and more generally any category of semi-abelian Hausdorff algebras. This gives rise to a generalized “Euclide's Postulate” and a five terms exact sequence
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
The theory of abelian categories proved very useful, providing an ax-iomatic framework for homology ...
AbstractWe give a unified treatment of the Baer sums in the context of efficiently homological categ...
This article treats the problem of deriving the reflector of a semi-abelian category Alpha onto a Bi...
All in-text references underlined in blue are linked to publications on ResearchGate, letting you ac...
Extending the work of Fröhlich, Lue and Furtado-Coelho, we consider the theory of Baer invariants in...
The purpose of the book is to take stock of the situation concerning Algebra via Category Theory in ...
Homological algebra is the study of how to associate sequences of algebraic objects such as abelian ...
We use Janelidze's Categorical Galois Theory to extend Brown and Ellis's higher Hopf formulae for ho...
Abstract: We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer...
Extending the work of Frohlich, Lue and Furtado-Coelho, we consider the theory of Baer invariants in...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
These lecture notes provide a self-contained introduction to a wide range of generalizations of Hopf...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
The theory of abelian categories proved very useful, providing an ax-iomatic framework for homology ...
AbstractWe give a unified treatment of the Baer sums in the context of efficiently homological categ...
This article treats the problem of deriving the reflector of a semi-abelian category Alpha onto a Bi...
All in-text references underlined in blue are linked to publications on ResearchGate, letting you ac...
Extending the work of Fröhlich, Lue and Furtado-Coelho, we consider the theory of Baer invariants in...
The purpose of the book is to take stock of the situation concerning Algebra via Category Theory in ...
Homological algebra is the study of how to associate sequences of algebraic objects such as abelian ...
We use Janelidze's Categorical Galois Theory to extend Brown and Ellis's higher Hopf formulae for ho...
Abstract: We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer...
Extending the work of Frohlich, Lue and Furtado-Coelho, we consider the theory of Baer invariants in...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
These lecture notes provide a self-contained introduction to a wide range of generalizations of Hopf...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
We show that the special Schreier extensions of monoids, with abelian kernel, admit a Baer sum const...
The theory of abelian categories proved very useful, providing an ax-iomatic framework for homology ...
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