We present two Dialectica-like constructions for models of intensional Martin-Löf type theory based on Gödel's original Dialectica interpretation and the Diller-Nahm variant, bringing dependent types to categorical proof theory. We set both constructions within a logical predicates style theory for display map categories where we show that 'quasifibred' versions of dependent products and universes suffice to construct their standard counterparts. To support the logic required for dependent products in the first construction, we propose a new semantic notion of finite sum for dependent types, generalizing finitely-complete extensive categories. The second avoids extensivity assumptions using biproducts in a Kleisli category for a fibred addi...
AbstractThis paper describes a fibrational categorical semantics for the modal necessity-only fragme...
In this talk, we will develop a type theory that is based solely on dependent inductive and coinduct...
This thesis consists of four papers on type theory and a formalisation of certain results from the t...
This note is about work in progress on the topic of “internal type theory ” where we investigate the...
AbstractThis note is about work in progress on the topic of “internal type theory” where we investig...
This note is about work in progress on the topic of "internal type theory" where we investigate the ...
We present the type theory CaTT, originally introduced by Finster and Mimram to describe globular we...
In this paper, I establish the categorical structure necessary to interpret dependent inductive and ...
International audienceIn this paper, we analyze and compare three of the many algebraic structures t...
We present a modular correspondence between various categorical structures and their internal langua...
It is well-known that simple type theory is complete with respect tonon-standard set-valued models. ...
In this paper, we analyze and compare three of the many algebraic structuresthat have been used for ...
When writing proofs, it is desirable to show that one’s proof is correct. With formalising a proof i...
This thesis studies the structure of categories of polynomials, the diagrams that represent polynomi...
The notion of a natural model of type theory is defined in terms of that of a representable natural ...
AbstractThis paper describes a fibrational categorical semantics for the modal necessity-only fragme...
In this talk, we will develop a type theory that is based solely on dependent inductive and coinduct...
This thesis consists of four papers on type theory and a formalisation of certain results from the t...
This note is about work in progress on the topic of “internal type theory ” where we investigate the...
AbstractThis note is about work in progress on the topic of “internal type theory” where we investig...
This note is about work in progress on the topic of "internal type theory" where we investigate the ...
We present the type theory CaTT, originally introduced by Finster and Mimram to describe globular we...
In this paper, I establish the categorical structure necessary to interpret dependent inductive and ...
International audienceIn this paper, we analyze and compare three of the many algebraic structures t...
We present a modular correspondence between various categorical structures and their internal langua...
It is well-known that simple type theory is complete with respect tonon-standard set-valued models. ...
In this paper, we analyze and compare three of the many algebraic structuresthat have been used for ...
When writing proofs, it is desirable to show that one’s proof is correct. With formalising a proof i...
This thesis studies the structure of categories of polynomials, the diagrams that represent polynomi...
The notion of a natural model of type theory is defined in terms of that of a representable natural ...
AbstractThis paper describes a fibrational categorical semantics for the modal necessity-only fragme...
In this talk, we will develop a type theory that is based solely on dependent inductive and coinduct...
This thesis consists of four papers on type theory and a formalisation of certain results from the t...