Adhesive categories have recently been proposed as a categorical foundation for facets of the theory of graph transformation, and have also been used to study techniques from process algebra for reasoning about concurrency. Here we continue our study of adhesive categories by showing that toposes are adhesive. The proof relies on exploiting the relationship between adhesive categories, Brown and Janelidze's work on generalised van Kampen theorems as well as Grothendieck's theory of descent
Adhesive categories provide an abstract setting for the double-pushout approach to rewriting, genera...
Adhesive categories provide an abstract framework for the algebraic approach to rewriting theory, wh...
Adhesive categories provide an abstract framework for the algebraic approach to rewriting theory, wh...
Adhesive categories have recently been proposed as a categorical foundation for facets of the theory...
Adhesive categories are categories which have pushouts with one leg a monomorphism, all pullbacks, a...
Adhesive categories are a class of categories in which pushouts along monos are well-behaved with re...
Adhesive categories are a class of categories in which pushouts along monos are well-behaved with re...
A category is adhesive if it has all pullbacks, all pushouts along monomorphisms, and all exactness ...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Adhesive high-level replacement (HLR) categories and systems are introduced as a new categorical fra...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Adhesive high-level replacement (HLR) systems are introduced as a new categorical framework for grap...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Adhesive high-level replacement (HLR) systems have been recently introduced as a new categorical fra...
We generalise both the notion of non-sequential process and the unfolding construction (previously d...
Adhesive categories provide an abstract setting for the double-pushout approach to rewriting, genera...
Adhesive categories provide an abstract framework for the algebraic approach to rewriting theory, wh...
Adhesive categories provide an abstract framework for the algebraic approach to rewriting theory, wh...
Adhesive categories have recently been proposed as a categorical foundation for facets of the theory...
Adhesive categories are categories which have pushouts with one leg a monomorphism, all pullbacks, a...
Adhesive categories are a class of categories in which pushouts along monos are well-behaved with re...
Adhesive categories are a class of categories in which pushouts along monos are well-behaved with re...
A category is adhesive if it has all pullbacks, all pushouts along monomorphisms, and all exactness ...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Adhesive high-level replacement (HLR) categories and systems are introduced as a new categorical fra...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Adhesive high-level replacement (HLR) systems are introduced as a new categorical framework for grap...
We introduce adhesive categories, which are categories with structure ensuring that pushouts along m...
Adhesive high-level replacement (HLR) systems have been recently introduced as a new categorical fra...
We generalise both the notion of non-sequential process and the unfolding construction (previously d...
Adhesive categories provide an abstract setting for the double-pushout approach to rewriting, genera...
Adhesive categories provide an abstract framework for the algebraic approach to rewriting theory, wh...
Adhesive categories provide an abstract framework for the algebraic approach to rewriting theory, wh...