Add to ORKGWe present a two-level theory to formalize constructive mathematics as advocated in a previous paper with G. Sambin. One level is given by an intensional type theory, called Minimal type theory. This theory extends a previous version with collections. The other level is given by an extensional set theory that is interpreted in the first one by means of a quotient model. This two-level theory has two main features: it is minimal among the most relevant foundations for constructive mathematics; it is constructive thanks to the way the extensional level is linked to the intensional one which fulfills the “proofs-as-programs ” paradigm and acts as a programming language
Intuitionistic type theory (also constructive type theory or Martin-L\uf6f type theory) is a formal ...
We analyze some extensions of Martin-L\uf6f's constructive type theory by means of extensional set c...
AbstractBishop’s informal set theory is briefly discussed and compared to Lawvere’s Elementary Theor...
We present a two-level theory to formalize constructive mathematics as advocated in a previous paper...
We present a two-level theory to formalize constructive mathematics as advocated in a previous paper...
The two main views in modern constructive mathematics usually associated with constructive type theo...
We consider an extensional version, called qmTT, of the intensional Minimal Type Theory mTT, introdu...
We apply some tools developed in categorical logic to give an abstract description of constructions ...
The first part of the paper introduces the varieties of modern constructive mathematics, concentrati...
In previous papers on this project a general static logical framework forformalizing and mechanizing...
We provide a categorical presentation of a realizability interpretation a ̀ la Kleene for the Minima...
The first part of the paper introduces the varieties of modern constructive mathematics, concentrati...
The first part of the paper introduces the varieties of modern constructive mathematics, concentrati...
This is the first of two articles dedicated to the notion of con-structive set. In them we attempt a...
Consistency with the formal Church\u2019s thesis, for short CT, and the axiom of choice, for short A...
Intuitionistic type theory (also constructive type theory or Martin-L\uf6f type theory) is a formal ...
We analyze some extensions of Martin-L\uf6f's constructive type theory by means of extensional set c...
AbstractBishop’s informal set theory is briefly discussed and compared to Lawvere’s Elementary Theor...
We present a two-level theory to formalize constructive mathematics as advocated in a previous paper...
We present a two-level theory to formalize constructive mathematics as advocated in a previous paper...
The two main views in modern constructive mathematics usually associated with constructive type theo...
We consider an extensional version, called qmTT, of the intensional Minimal Type Theory mTT, introdu...
We apply some tools developed in categorical logic to give an abstract description of constructions ...
The first part of the paper introduces the varieties of modern constructive mathematics, concentrati...
In previous papers on this project a general static logical framework forformalizing and mechanizing...
We provide a categorical presentation of a realizability interpretation a ̀ la Kleene for the Minima...
The first part of the paper introduces the varieties of modern constructive mathematics, concentrati...
The first part of the paper introduces the varieties of modern constructive mathematics, concentrati...
This is the first of two articles dedicated to the notion of con-structive set. In them we attempt a...
Consistency with the formal Church\u2019s thesis, for short CT, and the axiom of choice, for short A...
Intuitionistic type theory (also constructive type theory or Martin-L\uf6f type theory) is a formal ...
We analyze some extensions of Martin-L\uf6f's constructive type theory by means of extensional set c...
AbstractBishop’s informal set theory is briefly discussed and compared to Lawvere’s Elementary Theor...