The first-order hypothetical logic of proofs
The Propositional Logic of Proofs (LP) is a modal logic in which the modality □A is revisited as [[t]]A, t being an expression that bears witness to the validity of A. It enjoys arithmetical soundness and completeness, can realize all S4 theorems and is capable of reflecting its own proofs (⊢A impli...
Guardado en:
| Autores principales: | , |
|---|---|
| Formato: | JOUR |
| Materias: | |
| Acceso en línea: | http://hdl.handle.net/20.500.12110/paper_0955792X_v27_n4_p1023_Steren |
| Aporte de: |
| id |
todo:paper_0955792X_v27_n4_p1023_Steren |
|---|---|
| record_format |
dspace |
| spelling |
todo:paper_0955792X_v27_n4_p1023_Steren2023-10-03T15:51:51Z The first-order hypothetical logic of proofs Steren, G. Bonelli, E. Curry howard isomorphism First-order logic of proofs Lambda calculus Natural deduction Calculations Computer circuits Differentiation (calculus) Semantics Curry-Howard correspondence Curry-Howard isomorphism First order logic Lambda calculus Natural deduction Provability semantics Soundness and completeness Strong normalization Formal logic The Propositional Logic of Proofs (LP) is a modal logic in which the modality □A is revisited as [[t]]A, t being an expression that bears witness to the validity of A. It enjoys arithmetical soundness and completeness, can realize all S4 theorems and is capable of reflecting its own proofs (⊢A implies ⊢[[t]]A, for some t). A presentation of first-order LP has recently been proposed, FOLP, which enjoys arithmetical soundness and has an exact provability semantics. A key notion in this presentation is how free variables are dealt with in a formula of the form [[t]]A(i). We revisit this notion in the setting of a Natural Deduction presentation and propose a Curry-Howard correspondence for FOLP. A term assignment is provided and a proof of strong normalization is given. © The Author, 2016. JOUR info:eu-repo/semantics/openAccess http://creativecommons.org/licenses/by/2.5/ar http://hdl.handle.net/20.500.12110/paper_0955792X_v27_n4_p1023_Steren |
| institution |
Universidad de Buenos Aires |
| institution_str |
I-28 |
| repository_str |
R-134 |
| collection |
Biblioteca Digital - Facultad de Ciencias Exactas y Naturales (UBA) |
| topic |
Curry howard isomorphism First-order logic of proofs Lambda calculus Natural deduction Calculations Computer circuits Differentiation (calculus) Semantics Curry-Howard correspondence Curry-Howard isomorphism First order logic Lambda calculus Natural deduction Provability semantics Soundness and completeness Strong normalization Formal logic |
| spellingShingle |
Curry howard isomorphism First-order logic of proofs Lambda calculus Natural deduction Calculations Computer circuits Differentiation (calculus) Semantics Curry-Howard correspondence Curry-Howard isomorphism First order logic Lambda calculus Natural deduction Provability semantics Soundness and completeness Strong normalization Formal logic Steren, G. Bonelli, E. The first-order hypothetical logic of proofs |
| topic_facet |
Curry howard isomorphism First-order logic of proofs Lambda calculus Natural deduction Calculations Computer circuits Differentiation (calculus) Semantics Curry-Howard correspondence Curry-Howard isomorphism First order logic Lambda calculus Natural deduction Provability semantics Soundness and completeness Strong normalization Formal logic |
| description |
The Propositional Logic of Proofs (LP) is a modal logic in which the modality □A is revisited as [[t]]A, t being an expression that bears witness to the validity of A. It enjoys arithmetical soundness and completeness, can realize all S4 theorems and is capable of reflecting its own proofs (⊢A implies ⊢[[t]]A, for some t). A presentation of first-order LP has recently been proposed, FOLP, which enjoys arithmetical soundness and has an exact provability semantics. A key notion in this presentation is how free variables are dealt with in a formula of the form [[t]]A(i). We revisit this notion in the setting of a Natural Deduction presentation and propose a Curry-Howard correspondence for FOLP. A term assignment is provided and a proof of strong normalization is given. © The Author, 2016. |
| format |
JOUR |
| author |
Steren, G. Bonelli, E. |
| author_facet |
Steren, G. Bonelli, E. |
| author_sort |
Steren, G. |
| title |
The first-order hypothetical logic of proofs |
| title_short |
The first-order hypothetical logic of proofs |
| title_full |
The first-order hypothetical logic of proofs |
| title_fullStr |
The first-order hypothetical logic of proofs |
| title_full_unstemmed |
The first-order hypothetical logic of proofs |
| title_sort |
first-order hypothetical logic of proofs |
| url |
http://hdl.handle.net/20.500.12110/paper_0955792X_v27_n4_p1023_Steren |
| work_keys_str_mv |
AT stereng thefirstorderhypotheticallogicofproofs AT bonellie thefirstorderhypotheticallogicofproofs AT stereng firstorderhypotheticallogicofproofs AT bonellie firstorderhypotheticallogicofproofs |
| _version_ |
1807321046732242944 |