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From Abstract to Concrete Gödel's Incompleteness Theorems—Part I
| Title: | From Abstract to Concrete Gödel's Incompleteness Theorems—Part I |
| Authors: | Andrei Popescu (a /dot/ popescu /at/ mdx /dot/ ac /dot/ uk) and Dmitriy Traytel |
| Submission date: | 2020-09-16 |
| Abstract: | We validate an abstract formulation of Gödel's First and Second Incompleteness Theorems from a separate AFP entry by instantiating them to the case of finite sound extensions of the Hereditarily Finite (HF) Set theory, i.e., FOL theories extending the HF Set theory with a finite set of axioms that are sound in the standard model. The concrete results had been previously formalised in an AFP entry by Larry Paulson; our instantiation reuses the infrastructure developed in that entry. |
| BibTeX: |
@article{Goedel_HFSet_Semantic-AFP,
author = {Andrei Popescu and Dmitriy Traytel},
title = {From Abstract to Concrete Gödel's Incompleteness Theorems—Part I},
journal = {Archive of Formal Proofs},
month = sep,
year = 2020,
note = {\url{http://isa-afp.org/entries/Goedel_HFSet_Semantic.html},
Formal proof development},
ISSN = {2150-914x},
}
|
| License: | BSD License |
| Depends on: | Goedel_Incompleteness, Incompleteness |
| Status: [ok] | This is a development version of this entry. It might change over time and is not stable. Please refer to release versions for citations. |
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