AbstractIn this paper we introduce context categories to provide a framework for computations in context. The structure also provides a basis for developing the categorical proof theory of Girard's unified logic. A key feature of this logic is the separation of sequents into classical and linear zones. These zones may be modelled categorically as a context/computation separation given by a fibration. The perspective leads to an analysis of the exponential structure of linear logic using strength (or context) as the primitive notion.Context is represented by the classical zone on the left of the turnstile in unified logic. To model the classical zone to the right of the turnstile, it is necessary to introduce a notion of cocontext. This resu...
Proof Theory is the result of a tumultuous history, developed on the periphery of mainstream mathema...
AbstractWe consider the multiplicative and exponential fragment of linear logic (MELL) and give a ge...
AbstractCanonical extension has proven to be a powerful tool in algebraic study of propositional log...
AbstractIn this paper we introduce context categories to provide a framework for computations in con...
The major contributions of this thesis are in the areas of Geometry of Interaction (GoI) and full co...
The notion of context in functional languages no longer refers just to variables in scope. Context c...
There exists a KZ-doctrine on the 2-category of the locally small categories whose algebras are exac...
similar style of reasoning about structured data. They each consist of a structural (separating) com...
AbstractWe analyze the categorical foundations of Girard's Geometry of Interaction Program for Linea...
A quantificational framework of formal reasoning is proposed, which emphasises the pattern of enter...
Context Logic (CL) is a logic in the original sense, but more than that, it is a methodology for des...
Our main aim is to present the connection between λ-calculus and Cartesian closed categories both in...
The aim of this work is to define the categories GC, describe their categorical structure and show t...
AbstractThis is the first of a series of papers on coherence completions of categories. Here we show...
We explore the possibility and some potential payoffs of using the theory of accessible categories i...
Proof Theory is the result of a tumultuous history, developed on the periphery of mainstream mathema...
AbstractWe consider the multiplicative and exponential fragment of linear logic (MELL) and give a ge...
AbstractCanonical extension has proven to be a powerful tool in algebraic study of propositional log...
AbstractIn this paper we introduce context categories to provide a framework for computations in con...
The major contributions of this thesis are in the areas of Geometry of Interaction (GoI) and full co...
The notion of context in functional languages no longer refers just to variables in scope. Context c...
There exists a KZ-doctrine on the 2-category of the locally small categories whose algebras are exac...
similar style of reasoning about structured data. They each consist of a structural (separating) com...
AbstractWe analyze the categorical foundations of Girard's Geometry of Interaction Program for Linea...
A quantificational framework of formal reasoning is proposed, which emphasises the pattern of enter...
Context Logic (CL) is a logic in the original sense, but more than that, it is a methodology for des...
Our main aim is to present the connection between λ-calculus and Cartesian closed categories both in...
The aim of this work is to define the categories GC, describe their categorical structure and show t...
AbstractThis is the first of a series of papers on coherence completions of categories. Here we show...
We explore the possibility and some potential payoffs of using the theory of accessible categories i...
Proof Theory is the result of a tumultuous history, developed on the periphery of mainstream mathema...
AbstractWe consider the multiplicative and exponential fragment of linear logic (MELL) and give a ge...
AbstractCanonical extension has proven to be a powerful tool in algebraic study of propositional log...