Recently, Coquand and Palmgren considered systems of intuitionistic arithmetic in all finite types together with various forms of the axiom of choice and a numerical omniscience schema (NOS) which implies classical logic for arithmetical formulas. Feferman subsequently observed that the proof theoretic strength of such systems can be determined by functional interpretation based on a non-constructive -operator and his well-known results on the strength of this operator from the 70's. In this note we consider a weaker form LNOS (lesser numerical omniscience schema) of NOS which su#ces to derive the strong form of binary Konig's lemma studied by Coquand/Palmgren and gives rise to a new and mathematically strong semi-classical system...
Contribution à un ouvrage.In this paper, we propose new labelled proof systems to analyse the intuit...
AbstractBased on an analysis of the inference rules used, we provide a characterization of the situa...
Investigation of the space between intuitionistic and classical logics has been focused on intermedi...
Recently, Coquand and Palmgren considered systems of intuitionistic arithmeticin all finite types to...
The combinatorics of classical propositional logic lies at the heart of both local and global method...
AbstractThe combinatorics of classical propositional logic lies at the heart of both local and globa...
International audienceIn intuitionistic realizability like Kleene's or Kreisel's, the axiom of choic...
This is a survey of formal axiomatic systems for the three main varieties of constructive analysis, ...
C.I. Lewis invented modern modal logic as a theory of “strict implication” ⥽. Over the classical pro...
C.I. Lewis invented modern modal logic as a theory of “strict implication” ⥽. Over the classical pro...
We present a new functional interpretation, based on a novel assignment of formulas. In contrast wit...
Abstract—Martin-Löf’s type theory has strong existential elim-ination (dependent sum type) that allo...
AbstractA notion of feasible function of finite type based on the typed lambda calculus is introduce...
We study the arithmetical schema asserting that every eventually decreasing primitive recursive fun...
We present a possible computational content of the negative translation of classical analysis with t...
Contribution à un ouvrage.In this paper, we propose new labelled proof systems to analyse the intuit...
AbstractBased on an analysis of the inference rules used, we provide a characterization of the situa...
Investigation of the space between intuitionistic and classical logics has been focused on intermedi...
Recently, Coquand and Palmgren considered systems of intuitionistic arithmeticin all finite types to...
The combinatorics of classical propositional logic lies at the heart of both local and global method...
AbstractThe combinatorics of classical propositional logic lies at the heart of both local and globa...
International audienceIn intuitionistic realizability like Kleene's or Kreisel's, the axiom of choic...
This is a survey of formal axiomatic systems for the three main varieties of constructive analysis, ...
C.I. Lewis invented modern modal logic as a theory of “strict implication” ⥽. Over the classical pro...
C.I. Lewis invented modern modal logic as a theory of “strict implication” ⥽. Over the classical pro...
We present a new functional interpretation, based on a novel assignment of formulas. In contrast wit...
Abstract—Martin-Löf’s type theory has strong existential elim-ination (dependent sum type) that allo...
AbstractA notion of feasible function of finite type based on the typed lambda calculus is introduce...
We study the arithmetical schema asserting that every eventually decreasing primitive recursive fun...
We present a possible computational content of the negative translation of classical analysis with t...
Contribution à un ouvrage.In this paper, we propose new labelled proof systems to analyse the intuit...
AbstractBased on an analysis of the inference rules used, we provide a characterization of the situa...
Investigation of the space between intuitionistic and classical logics has been focused on intermedi...