Abstract
Adhesive categories are a class of categories in which pushouts along monos are well-behaved with respect to pullbacks. Recently it has been shown that any topos is adhesive. Many examples of interest to computer scientists are not adhesive, a fact which motivated the introduction of quasiadhesive categories. We show that several of these examples arise via a glueing construction which yields quasitoposes. We show that, surprisingly, not all such quasitoposes are quasiadhesive and characterise precisely those which are by giving a succinct necessary and sufficient condition on the lattice of subobjects.
| Original language | English |
|---|---|
| Number of pages | 15 |
| Journal | Lecture Notes in Computer Science |
| Publication status | Published - 2007 |
Keywords
- categories (mathematics)
- toposes
- closed categories (mathematics)
- functor theory
- transformations (mathematics)