Great theorems of logic
edit- Proof of the uncountability of the set of all subsets of the set of natural numbers -- Cantor's diagonal proof
- Proof of the consistency of truth-functional propositional logic (Post 1920)
- Proof of the semantic completeness of truth-functional propositional logic
- Proof of the syntactic completeness of truth-functional propositional logic
- Proof of the decidability of truth-functional propositional logic (Post 1920)
- Proof of the consistency of first order monadic predicate logic
- Proof of the semantic completeness of first order monadic predicate logic
- Proof of the decidability of monadic predicate logic (Lowenheim 1915)
- Proof of the consistency of first order predicate logic (Hilbert-Ackermann 1928)
- Proof of the semantic completeness of first order predicate logic (Godel 1930)
- Proof of the undecidability of first order predicate logic (Church 1936) Church's theorem
- Post's functional completeness theorem
- Hilbert's map of geometry onto algebra.
- Lowenheim-Skolem theorem
- Cantor's theorem
- Gentzen's consistency proof
- Godel's first incompleteness theorem (1931)
- Godel's second incompleteness theorem (1931)
- Godel's completeness theorem (1930)
- Turing's halting theorem
- Church-Turing thesis
- Davis-Putnam algorithm
- Banach-Tarski paradox
- Tarski's indefinability theorem
- Löb's theorem
- Church–Rosser theorem
- Decidability
- Church (1956)
- Quine (1953)
- Kalmar (1936)
- Meyer and Lambert (1967)