A symmetric lambda calculus for classical program extraction
Information and Computation - special issue: symposium on theoretical aspects of computer software TACS '94
A Curry-Howard foundation for functional computation with control
Proceedings of the 24th ACM SIGPLAN-SIGACT symposium on Principles of programming languages
Lambda-My-Calculus: An Algorithmic Interpretation of Classical Natural Deduction
LPAR '92 Proceedings of the International Conference on Logic Programming and Automated Reasoning
On the Relation between the Lambda-Mu-Calculus and the Syntactic Theory of Sequential Control
LPAR '94 Proceedings of the 5th International Conference on Logic Programming and Automated Reasoning
On the Computational Interpretation of Negation
Proceedings of the 14th Annual Conference of the EACSL on Computer Science Logic
KGC '93 Proceedings of the Third Kurt Gödel Colloquium on Computational Logic and Proof Theory
A CPS-Translation of the Lambda-µ-Calculus
CAAP '94 Proceedings of the 19th International Colloquium on Trees in Algebra and Programming
Classical logic, continuation semantics and abstract machines
Journal of Functional Programming
Strong normalization proofs by CPS-translations
Information Processing Letters
Arithmetical Proofs of Strong Normalization Results for Symmetric λ-calculi
Fundamenta Informaticae - Typed Lambda Calculi and Applications 2005, Selected Papers
Why the Usual Candidates of Reducibility Do Not Work for the Symmetric λμ-calculus
Electronic Notes in Theoretical Computer Science (ENTCS)
Arithmetical proofs of strong normalization results for the symmetric λµ-calculus
TLCA'05 Proceedings of the 7th international conference on Typed Lambda Calculi and Applications
Arithmetical Proofs of Strong Normalization Results for Symmetric λ-calculi
Fundamenta Informaticae - Typed Lambda Calculi and Applications 2005, Selected Papers
Hi-index | 0.00 |
Parigot suggested symmetric structural reduction rules for application to 碌-abstraction in [9]to ensure unique representation of data type. We prove strong normalization of second order 驴碌-calculus with these rules.