Add to ORKGAbstract. We show that the category of abstract elementary classes (AECs) and concrete functors is closed under constructions of “limit type, ” which generalizes the approach of Mariano, Zambrano and Villaveces away from the syntactically oriented framework of institutions. Moreover, we provide a broader view of this closure phe-nomenon, considering a variety of categories of accessible categories with additional structure, and relaxing the assumption that the morphisms be concrete functors. 1
which permits unrestricted use, distribution, and reproduction in any medium, provided the original ...
AbstractIt is shown that flat covers exist in a wide class of additive categories – we call them ele...
In this paper some of the basics of classification theory for abstract elementary classes are discus...
AbstractWe highlight connections between accessible categories and abstract elementary classes (AECs...
We introduce µ-Abstract Elementary Classes (µ-AECs) as a broad framework for model theory that inclu...
Abstract. We introduce µ-Abstract Elementary Classes (µ-AECs) as a broad framework for model theory ...
AbstractWe investigate properties of accessible categories with directed colimits and their relation...
We consider the behavior of Galois types in abstract elementary classes (AECs), and introduce severa...
To complete a category is to embed it into a larger one which is closed under a given type of limits...
We show that the concept of an Abstract Elementary Class (AEC) provides a unifying notion for severa...
Abstract Notions of strongly and absolutely closed objects with respect to a closure operator C on a...
AbstractThe results in this paper are in a context of abstract elementary classes identified by Shel...
Abstract. We investigate categorical versions of algebraically closed ( = pure) embeddings, existent...
Summary. In the paper, we develop the notation of duality and equivalence of categories and concrete...
We show that in a finitely accessible additive category every class of objects closed under direct l...
which permits unrestricted use, distribution, and reproduction in any medium, provided the original ...
AbstractIt is shown that flat covers exist in a wide class of additive categories – we call them ele...
In this paper some of the basics of classification theory for abstract elementary classes are discus...
AbstractWe highlight connections between accessible categories and abstract elementary classes (AECs...
We introduce µ-Abstract Elementary Classes (µ-AECs) as a broad framework for model theory that inclu...
Abstract. We introduce µ-Abstract Elementary Classes (µ-AECs) as a broad framework for model theory ...
AbstractWe investigate properties of accessible categories with directed colimits and their relation...
We consider the behavior of Galois types in abstract elementary classes (AECs), and introduce severa...
To complete a category is to embed it into a larger one which is closed under a given type of limits...
We show that the concept of an Abstract Elementary Class (AEC) provides a unifying notion for severa...
Abstract Notions of strongly and absolutely closed objects with respect to a closure operator C on a...
AbstractThe results in this paper are in a context of abstract elementary classes identified by Shel...
Abstract. We investigate categorical versions of algebraically closed ( = pure) embeddings, existent...
Summary. In the paper, we develop the notation of duality and equivalence of categories and concrete...
We show that in a finitely accessible additive category every class of objects closed under direct l...
which permits unrestricted use, distribution, and reproduction in any medium, provided the original ...
AbstractIt is shown that flat covers exist in a wide class of additive categories – we call them ele...
In this paper some of the basics of classification theory for abstract elementary classes are discus...