Axiom Of Choice

This non-implication, Form 155 \( \not \Rightarrow \) Form 410, whose code is 4, is constructed around a proven non-implication as follows:

An (optional) implication of code 1 or code 2 is given. In this case, it's Code 2: 3946, whose string of implications is: 43 \(\Rightarrow\) 78 \(\Rightarrow\) 155

A proven non-implication whose code is 3. In this case, it's Code 3: 68, Form 43 \( \not \Rightarrow \) Form 410 whose summary information is:

Hypothesis	Statement
Form 43	<p> \(DC(\omega)\) (DC), <strong>Principle of Dependent Choices:</strong> If \(S\) is a relation on a non-empty set \(A\) and \((\forall x\in A) (\exists y\in A)(x S y)\) then there is a sequence \(a(0), a(1), a(2), \ldots\) of elements of \(A\) such that \((\forall n\in\omega)(a(n)\mathrel S a(n+1))\). See <a href="/articles/Tarski-1948">Tarski [1948]</a>, p 96, <a href="/articles/Levy-1964">Levy [1964]</a>, p. 136. </p>

Conclusion	Statement
Form 410	<p> <strong>RC (Reflexive Compactness)</strong>: The closed unit ball of a reflexive normed space is compact for the weak topology. </p>

This non-implication was constructed without the use of this last code 2/1 implication

The conclusion Form 155 \( \not \Rightarrow \) Form 410 then follows.

Finally, the
List of models where hypothesis is true and the conclusion is false:

Name	Statement
\(\cal M27\) Pincus/Solovay Model I	Let \(\cal M_1\) be a model of \(ZFC + V =L\)