Confluence of extensional and non-extensional λ-calculi with explicit substitutions
Identifieur interne : 002010 ( Istex/Checkpoint ); précédent : 002009; suivant : 002011Confluence of extensional and non-extensional λ-calculi with explicit substitutions
Auteurs : Delia Kesner [France]Source :
- Theoretical Computer Science [ 0304-3975 ] ; 2000.
English descriptors
- Teeft :
- Basic conditions, Basic substitution calculus, Beta, Beta rule, Bruijn, Calculus, Cient, Clos, Closure, Combinatory reduction systems, Computer science, Conditional rule, Conf, Curien, Erent, Expansion rule, Explicit substitutions, Extensional, Free variables, Functional programming, Fvarlift1, Generalized interpretation method, Hardin, Induction hypothesis, Internat, Interpretation method, Kesner, Lambda, Lambda calculi, Lecture notes, Liftn, Natural number, Natural numbers, Normal form, Normal forms, Normalization, Open terms, Proc, Pure term, Pure terms, Reduction relation, Reduction rule, Reduction rules, Resp, Same time, Shiftcons, Springer, Strong normalization, Substitution, Substitution calculus, Substitution language, Substitution signature, Uence, Uent, Universit.
Abstract
Abstract: This paper studies confluence of extensional and non-extensional λ-calculi with explicit substitutions, where extensionality is interpreted by η-expansion. For that, we propose a scheme for explicit substitutions which describes those abstract properties that are sufficient to guarantee confluence. Our method makes it possible to treat at the same time many well-known calculi such as λσ,λσ⇑,λφ,λs,λv,λf,λd and λdn.
Url:
DOI: 10.1016/S0304-3975(98)00166-2
Affiliations:
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<front><div type="abstract" xml:lang="en">Abstract: This paper studies confluence of extensional and non-extensional λ-calculi with explicit substitutions, where extensionality is interpreted by η-expansion. For that, we propose a scheme for explicit substitutions which describes those abstract properties that are sufficient to guarantee confluence. Our method makes it possible to treat at the same time many well-known calculi such as λσ,λσ⇑,λφ,λs,λv,λf,λd and λdn.</div>
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