We introduce a new typed combinatory calculus with a type constructor that, to each type σ, associates the star type σ^∗ of the nonempty finite subsets of elements of type σ. We prove that this calculus enjoys the properties of strong normalization and confluence. With the aid of this star combinatory calculus, we define a functional interpretation of first-order predicate logic and prove a corresponding soundness theorem. It is seen that each theorem of classical first-order logic is connected with certain formulas which are tautological in character. As a corollary, we reprove Herbrand’s theorem on the extraction of terms from classically provable existential statements.info:eu-repo/semantics/publishedVersio
AbstractA notion of feasible function of finite type based on the typed lambda calculus is introduce...
We begin with a disucssion of some of the serious deficiencies of first order predicate languages. T...
International audienceHerbrand's theorem, widely regarded as a cornerstone of proof theory, exposes ...
International audienceWe present a new Curry-Howard correspondence for classical first-order natural...
International audienceWe describe a realizability framework for classical first-order logic in which...
International audienceCombinatory logic shows that bound variables can be eliminated without loss of...
We show that the types of the witnesses in the Herbrand functional interpretation can be simplified,...
We present a calculus providing a Curry-Howard correspondence to classical logic represented in the ...
Recently, the second author, Briseid, and Safarik introduced nonstandard Dialectica, a functional in...
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Abstract. A unified approach 1 to the construction of original forms of the famous Herbrand theorem ...
In this thesis we use the syntactic-semantic method of constructive type theory to give meaning to c...
Carrying out a suggestion by Kreisel, we adapt Gödel's functional interpretation to ordinary first-o...
Herbrand's theorem, widely regarded as a cornerstone of proof theory, exposes some of the constructi...
Intuitionistic first-order logic extended with a restricted form of Markov\u27s principle is constru...
AbstractA notion of feasible function of finite type based on the typed lambda calculus is introduce...
We begin with a disucssion of some of the serious deficiencies of first order predicate languages. T...
International audienceHerbrand's theorem, widely regarded as a cornerstone of proof theory, exposes ...
International audienceWe present a new Curry-Howard correspondence for classical first-order natural...
International audienceWe describe a realizability framework for classical first-order logic in which...
International audienceCombinatory logic shows that bound variables can be eliminated without loss of...
We show that the types of the witnesses in the Herbrand functional interpretation can be simplified,...
We present a calculus providing a Curry-Howard correspondence to classical logic represented in the ...
Recently, the second author, Briseid, and Safarik introduced nonstandard Dialectica, a functional in...
We present a new Curry-Howard correspondence for classical first-order natural deduction. We add to ...
Abstract. A unified approach 1 to the construction of original forms of the famous Herbrand theorem ...
In this thesis we use the syntactic-semantic method of constructive type theory to give meaning to c...
Carrying out a suggestion by Kreisel, we adapt Gödel's functional interpretation to ordinary first-o...
Herbrand's theorem, widely regarded as a cornerstone of proof theory, exposes some of the constructi...
Intuitionistic first-order logic extended with a restricted form of Markov\u27s principle is constru...
AbstractA notion of feasible function of finite type based on the typed lambda calculus is introduce...
We begin with a disucssion of some of the serious deficiencies of first order predicate languages. T...
International audienceHerbrand's theorem, widely regarded as a cornerstone of proof theory, exposes ...