Empirical thesis.Bibliography: pages 95-96.1. Introduction -- 2. Cocompletion of restriction categories -- 3. Free cocompletion of locally small restriction categories -- 4. Restriction presheaves -- 5. Cocompletion of join restriction categories -- 6. Join restriction presheaves -- 7. Restriction colimits -- 8. Atlases and their gluings -- 9. Restriction profunctors and other restriction definitions -- References.Restriction categories, as defined by Cockett and Lack, are an abstraction of the notion of partial functions between sets, and therefore, are important in furthering our understanding of what it means to be partial. This thesis builds upon the work of Cockett and Lack, by providing restriction analogues of notions from ordinary c...
Restriction mapping enerally requires the application of information from various digestions by rest...
AbstractFor a small category K enriched over a suitable monoidal category V, the free completion of ...
The aim of this thesis is to further develop the theory of accessible categories in the enriched con...
Theoretical thesis.Bibliography: page [51]1. Introduction -- 2. Restriction categories -- 3. Restric...
Restriction categories were introduced as a simple equational axiomatisation for categories of parti...
A restriction category is an abstract formulation for a category of partial maps, defined in terms o...
Abstract. The construction of a free restriction category can be broken into two steps: the construc...
2 Cartesian restriction categories and objects of partial maps 6 2.1 Preliminaries on restriction ca...
AbstractGiven a category with a stable system of monics, one can form the corresponding category of ...
AbstractAn algebraic characterization of monads which are abstract partial map classifiers is provid...
Abstract. We combine two recent ideas: cartesian differential categories, and restric-tion categorie...
We show that Schmitt's restriction species (such as graphs, matroids, posets, etc.) naturally induce...
Precategories generalize both the notions of strict n-category and sesquicategory: their definition ...
One way of interpreting a left Kan extension is as taking a kind of “partial colimit”, whereby one r...
AbstractFor a set F of small categories, F-conservative cocompletions of a category are cocompletion...
Restriction mapping enerally requires the application of information from various digestions by rest...
AbstractFor a small category K enriched over a suitable monoidal category V, the free completion of ...
The aim of this thesis is to further develop the theory of accessible categories in the enriched con...
Theoretical thesis.Bibliography: page [51]1. Introduction -- 2. Restriction categories -- 3. Restric...
Restriction categories were introduced as a simple equational axiomatisation for categories of parti...
A restriction category is an abstract formulation for a category of partial maps, defined in terms o...
Abstract. The construction of a free restriction category can be broken into two steps: the construc...
2 Cartesian restriction categories and objects of partial maps 6 2.1 Preliminaries on restriction ca...
AbstractGiven a category with a stable system of monics, one can form the corresponding category of ...
AbstractAn algebraic characterization of monads which are abstract partial map classifiers is provid...
Abstract. We combine two recent ideas: cartesian differential categories, and restric-tion categorie...
We show that Schmitt's restriction species (such as graphs, matroids, posets, etc.) naturally induce...
Precategories generalize both the notions of strict n-category and sesquicategory: their definition ...
One way of interpreting a left Kan extension is as taking a kind of “partial colimit”, whereby one r...
AbstractFor a set F of small categories, F-conservative cocompletions of a category are cocompletion...
Restriction mapping enerally requires the application of information from various digestions by rest...
AbstractFor a small category K enriched over a suitable monoidal category V, the free completion of ...
The aim of this thesis is to further develop the theory of accessible categories in the enriched con...