AbstractFor a small category K enriched over a suitable monoidal category V, the free completion of K under colimits is the presheaf category [Kop,V]. If K is large, its free completion under colimits is the V-category PK of small presheaves on K, where a presheaf is small if it is a left Kan extension of some presheaf with small domain. We study the existence of limits and of monoidal closed structures on PK
Abstract. Consider a diagram of quasi-categories that admit and functors that preserve limits or col...
variant functors from s? to sets. A typical example is the subcategory on one free algebra on n gene...
The aim of this thesis is to further develop the theory of accessible categories in the enriched con...
AbstractIn this work it is shown that if the underlying category V0 of a symmetric closed monoidal c...
AbstractFor a small category C with multilimits for finite diagrams, a conceptual description of its...
ABSTRACT. Strong promonoidal functors are defined. Left Kan extension (also called “existential quan...
We consider category theory enriched in a locally finitely presentable symmetric monoidal closed cat...
AbstractIn 1978, Street and Walters defined a locally small category K to be totally cocomplete if i...
ABSTRACT. Free regular and exact completions of categories with various ranks of weak limits are pre...
One way of interpreting a left Kan extension is as taking a kind of “partial colimit”, whereby one r...
AbstractGiven an endofunctor F on the category of sets, we investigate how the structure theory of S...
AbstractWe consider V-categories where V is a symmetric monoidal closed category, and we write φ * T...
We prove that for each locally α-presentable category K there exists a regular cardinal γ such that ...
AbstractWe study several possible weakenings of the notion of limit and the associated notions of co...
Abstract. Consider a diagram of quasi-categories that admit and functors that preserve limits or col...
Abstract. Consider a diagram of quasi-categories that admit and functors that preserve limits or col...
variant functors from s? to sets. A typical example is the subcategory on one free algebra on n gene...
The aim of this thesis is to further develop the theory of accessible categories in the enriched con...
AbstractIn this work it is shown that if the underlying category V0 of a symmetric closed monoidal c...
AbstractFor a small category C with multilimits for finite diagrams, a conceptual description of its...
ABSTRACT. Strong promonoidal functors are defined. Left Kan extension (also called “existential quan...
We consider category theory enriched in a locally finitely presentable symmetric monoidal closed cat...
AbstractIn 1978, Street and Walters defined a locally small category K to be totally cocomplete if i...
ABSTRACT. Free regular and exact completions of categories with various ranks of weak limits are pre...
One way of interpreting a left Kan extension is as taking a kind of “partial colimit”, whereby one r...
AbstractGiven an endofunctor F on the category of sets, we investigate how the structure theory of S...
AbstractWe consider V-categories where V is a symmetric monoidal closed category, and we write φ * T...
We prove that for each locally α-presentable category K there exists a regular cardinal γ such that ...
AbstractWe study several possible weakenings of the notion of limit and the associated notions of co...
Abstract. Consider a diagram of quasi-categories that admit and functors that preserve limits or col...
Abstract. Consider a diagram of quasi-categories that admit and functors that preserve limits or col...
variant functors from s? to sets. A typical example is the subcategory on one free algebra on n gene...
The aim of this thesis is to further develop the theory of accessible categories in the enriched con...
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