Diaconescu-Goodman-Myhill Theorem
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In mathematical logic, Diaconescu's theorem, or the Goodman–Myhill theorem, states that the full axiom of choice is sufficient to derive the law of the excluded middle, or restricted forms of it, in constructive set theory. It was discovered in 1975 by Radu Diaconescu and later by Goodman and Myhill. Already in 1967,
Errett Bishop Errett Albert Bishop (July 14, 1928 – April 14, 1983) was an American mathematician known for his work on analysis. He expanded constructive analysis in his 1967 ''Foundations of Constructive Analysis'', where he proved most of the important th ...
posed the theorem as an exercise (Problem 2 on page 58 in ''Foundations of constructive analysis''E. Bishop, ''Foundations of constructive analysis'', McGraw-Hill (1967)).


Proof

For any proposition P\,, we can build the sets : U = \ and : V = \. These are sets, using the axiom of specification. In classical set theory this would be equivalent to : U = \begin \, & \mbox P \\ \, & \mbox \neg P\end and similarly for V\,. However, without the law of the excluded middle, these equivalences cannot be proven; in fact the two sets are not even provably finite (in the usual sense of being in
bijection In mathematics, a bijection, also known as a bijective function, one-to-one correspondence, or invertible function, is a function between the elements of two sets, where each element of one set is paired with exactly one element of the other s ...
with a natural number, though they would be in the Dedekind sense). Assuming the axiom of choice, there exists a choice function for the set \{U, V\}\,; that is, a function f\, such that : (U) \in U\wedge (V) \in V\, By the definition of the two sets, this means that : f(U) = 0) \vee P\wedge f(V) = 1) \vee P,, which implies (f(U) \neq f(V)) \vee P. But since P \to (U = V) (by the axiom of extensionality), therefore P \to (f(U) = f(V))\,, so : (f(U) \neq f(V)) \to \neg P. Thus \neg P \vee P. As this could be done for any proposition, this completes the proof that the axiom of choice implies the law of the excluded middle. The proof relies on the use of the full separation axiom. In constructive set theories with only the predicative separation, the form of ''P'' will be restricted to sentences with bound quantifiers only, giving only a restricted form of the law of the excluded middle. This restricted form is still not acceptable constructively. In constructive type theory, or in Heyting arithmetic extended with finite types, there is typically no separation at all—subsets of a type are given different treatments. A form of the axiom of choice is a theorem, yet excluded middle is not.


Notes

Constructivism (mathematics) Set theory Axiom of choice