Add to ORKGWe prove a strictification theorem for cartesian closed bicategories. First, we adapt Power’s proof of coherence for bicategories with finite bilimits to show that every bicategory with bicategorical cartesian closed structure is biequivalent to a 2-category with 2-categorical cartesian closed structure. Then we show how to extend this result to a Mac Lane-style “all pasting diagrams commute” coherence theorem: precisely, we show that in the free cartesian closed bicategory on a graph, there is at most one 2-cell between any parallel pair of 1-cells. The argument we employ is reminiscent of that used by Čubrić, Dybjer, and Scott to show normalisation for the simply-typed lambda calculus (Čubrić et al., 1998). The main results first appeared...
Abstract. Seely’s paper Locally cartesian closed categories and type the-ory contains a well-known r...
String diagrams can be used as a compositional syntax for different kinds of computational structur...
Abstract. Seely’s paper Locally cartesian closed categories and type the-ory contains a well-known r...
Abstract We prove a strictification theorem for cartesian closed bicategories. First, we adapt Po...
We present two proofs of coherence for cartesian closed bicat- egories. Precisely, we show that in t...
We construct an internal language for cartesian closed bicategories. Precisely, we introduce a type ...
Mac Lane's coherence theorem states that all diagrams in the free monoidal category commute. In...
coherence theorem for bicategories) Every bicategory is biequivalent to a 2-category. Proof This is...
AbstractThis is the first of a series of papers on coherence completions of categories. Here we show...
AbstractWe summarize some recent results on coherence completions of categories. Our goal is to demo...
Over the recent years, the theory of rewriting has been used and extended in order to provide system...
Over the recent years, the theory of rewriting has been used and extended in order to provide system...
Over the recent years, the theory of rewriting has been used and extended in order to provide system...
This paper is about coherence for self-similarity (the categorical iden-tity S ∼ = S ⊗ S), its relat...
AbstractAlmost all of the categories normally used as a mathematical foundation for denotational sem...
Abstract. Seely’s paper Locally cartesian closed categories and type the-ory contains a well-known r...
String diagrams can be used as a compositional syntax for different kinds of computational structur...
Abstract. Seely’s paper Locally cartesian closed categories and type the-ory contains a well-known r...
Abstract We prove a strictification theorem for cartesian closed bicategories. First, we adapt Po...
We present two proofs of coherence for cartesian closed bicat- egories. Precisely, we show that in t...
We construct an internal language for cartesian closed bicategories. Precisely, we introduce a type ...
Mac Lane's coherence theorem states that all diagrams in the free monoidal category commute. In...
coherence theorem for bicategories) Every bicategory is biequivalent to a 2-category. Proof This is...
AbstractThis is the first of a series of papers on coherence completions of categories. Here we show...
AbstractWe summarize some recent results on coherence completions of categories. Our goal is to demo...
Over the recent years, the theory of rewriting has been used and extended in order to provide system...
Over the recent years, the theory of rewriting has been used and extended in order to provide system...
Over the recent years, the theory of rewriting has been used and extended in order to provide system...
This paper is about coherence for self-similarity (the categorical iden-tity S ∼ = S ⊗ S), its relat...
AbstractAlmost all of the categories normally used as a mathematical foundation for denotational sem...
Abstract. Seely’s paper Locally cartesian closed categories and type the-ory contains a well-known r...
String diagrams can be used as a compositional syntax for different kinds of computational structur...
Abstract. Seely’s paper Locally cartesian closed categories and type the-ory contains a well-known r...