Axiom Of Choice

This non-implication, Form 322 \( \not \Rightarrow \) Form 9, whose code is 6, is constructed around a proven non-implication as follows:

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

A proven non-implication whose code is 5. In this case, it's Code 3: 652, Form 322 \( \not \Rightarrow \) Form 390 whose summary information is:

Hypothesis	Statement
Form 322	<p> \(KW(WO,\infty)\), <strong>The Kinna-Wagner Selection Principle for a well ordered family of sets:</strong> For every well ordered set \(M\) there is a function \(f\) such that for all \(A\in M\), if \(\|A\|>1\) then \(\emptyset\neq f(A)\subsetneq A\). (See <a href="/form-classes/howard-rubin-15">Form 15</a>). </p>

Conclusion	Statement
Form 390	<p> Every infinite set can be partitioned either into two infinite sets or infinitely many sets, each of which has at least two elements. <a href="/excerpts/Ash-1981-1">Ash [1983]</a>. </p>

An (optional) implication of code 1 or code 2 is given. In this case, it's Code 2: 1041, whose string of implications is: 9 \(\Rightarrow\) 64 \(\Rightarrow\) 390

The conclusion Form 322 \( \not \Rightarrow \) Form 9 then follows.

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

Name	Statement
\(\cal N1\) The Basic Fraenkel Model	The set of atoms, \(A\) is denumerable; \(\cal G\) is the group of all permutations on \(A\); and \(S\) isthe set of all finite subsets of \(A\)