Add to ORKGWe give a proof that all terms that type-check in the theory of contructions are strongly normalizing (under ß-reduction). The main novelty of this proof is that it uses a Kripke-like interpretation of the types and kinds, and that it does not use infinite contexts. We explore some consequences of strong normalization, consistency and decidability of typechecking. We also show that our proof yields another proof of strong normalization for LF (under ß-reduction), using the reducibility method
AbstractFor some typedλ-calculi it is easier to prove weak normalization than strong normalization. ...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
We prove the strong normalisation for any PTS, provided the existence of a certain-set A * (s) fo...
We give a proof that all terms that type-check in the theory of contructions are strongly normalizin...
We give a proof that all terms that type-check in the theory of contructions are strongly normalizin...
AbstractWe introduce a new unification procedure for the type inference problem in the intersection ...
AbstractTait's proof of strong normalization for the simply typed λ-calculus is interpreted in a gen...
AbstractWe present an evaluation technique for proving strong normalization (SN). We use the techniq...
In this paper we prove that any subexpression of a correct judgement in Martin-Löf's Type Theory is ...
Abstract. We consider a simplified version of Nakano’s guarded fixed-point types in a representation...
Abstract. We consider a simplified version of Nakano’s guarded fixed-point types in a presentation o...
Abstract. We consider a simplified version of Nakano’s guarded fixed-point types in a presentation o...
Ulrich Berger presented a powerful proof of strong normalisation usingdomains, in particular it simp...
Abstract. We consider a simplified version of Nakano’s guarded fixed-point types in a representation...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
AbstractFor some typedλ-calculi it is easier to prove weak normalization than strong normalization. ...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
We prove the strong normalisation for any PTS, provided the existence of a certain-set A * (s) fo...
We give a proof that all terms that type-check in the theory of contructions are strongly normalizin...
We give a proof that all terms that type-check in the theory of contructions are strongly normalizin...
AbstractWe introduce a new unification procedure for the type inference problem in the intersection ...
AbstractTait's proof of strong normalization for the simply typed λ-calculus is interpreted in a gen...
AbstractWe present an evaluation technique for proving strong normalization (SN). We use the techniq...
In this paper we prove that any subexpression of a correct judgement in Martin-Löf's Type Theory is ...
Abstract. We consider a simplified version of Nakano’s guarded fixed-point types in a representation...
Abstract. We consider a simplified version of Nakano’s guarded fixed-point types in a presentation o...
Abstract. We consider a simplified version of Nakano’s guarded fixed-point types in a presentation o...
Ulrich Berger presented a powerful proof of strong normalisation usingdomains, in particular it simp...
Abstract. We consider a simplified version of Nakano’s guarded fixed-point types in a representation...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
AbstractFor some typedλ-calculi it is easier to prove weak normalization than strong normalization. ...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
We prove the strong normalisation for any PTS, provided the existence of a certain-set A * (s) fo...