Soundness and Completeness of an Axiomatic System for First-Order Logic

Asta Halkjær From 🌐

September 24, 2021

Abstract

This work is a formalization of the soundness and completeness of an axiomatic system for first-order logic. The proof system is based on System Q1 by Smullyan and the completeness proof follows his textbook "First-Order Logic" (Springer-Verlag 1968). The completeness proof is in the Henkin style where a consistent set is extended to a maximal consistent set using Lindenbaum's construction and Henkin witnesses are added during the construction to ensure saturation as well. The resulting set is a Hintikka set which, by the model existence theorem, is satisfiable in the Herbrand universe. Paper: doi.org/10.4230/LIPIcs.TYPES.2021.8.

License

BSD License

Topics

Session FOL_Axiomatic

Cite

× 
@article{FOL_Axiomatic-AFP,
  author  = {Asta Halkjær From},
  title   = {Soundness and Completeness of an Axiomatic System for First-Order Logic},
  journal = {Archive of Formal Proofs},
  month   = {September},
  year    = {2021},
  note    = {\url{https://isa-afp.org/entries/FOL_Axiomatic.html},
             Formal proof development},
  ISSN    = {2150-914x},
}
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