Axiom Of Choice

This non-implication, Form 118 \( \not \Rightarrow \) Form 192, whose code is 4, 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 3. In this case, it's Code 3: 966, Form 118 \( \not \Rightarrow \) Form 106 whose summary information is:

Hypothesis Statement

Form 118 Every linearly orderable topological space is normal. <a href="/books/28">Birkhoff [1967]</a>, p 241. 

Conclusion Statement

Form 106 Baire Category Theorem for Compact Hausdorff Spaces: Every compact Hausdorff space is Baire.
An (optional) implication of code 1 or code 2 is given. In this case, it's Code 2: 3878, whose string of implications is: 192 \(\Rightarrow\) 43 \(\Rightarrow\) 106

Hypothesis	Statement
Form 118	<p> Every linearly orderable topological space is normal. <a href="/books/28">Birkhoff [1967]</a>, p 241. </p>

Conclusion	Statement
Form 106	<p> <strong>Baire Category Theorem for Compact Hausdorff Spaces:</strong> Every compact Hausdorff space is Baire. <p>

The conclusion Form 118 \( \not \Rightarrow \) Form 192 then follows.

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

Name	Statement
\(\cal M1\) Cohen's original model	Add a denumerable number of generic reals (subsets of \(\omega\)), \(a_1\), \(a_2\), \(\cdots\), along with the set \(b\) containing them
\(\cal N1\) 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 \(A\)
\(\cal N4\) The Mathias/Pincus Model I	\(A\) is countably infinite;\(\precsim\) is a universal homogeneous partial ordering on \(A\) (See<a href="/articles/Jech-1973b">Jech [1973b]</a> p 101 for definitions.); \(\cal G\) is the group ofall order automorphisms on \((A,\precsim)\); and \(S\) is the set of allfinite subsets of \(A\)
\(\cal N24\) Hickman's Model I	This model is a variation of \(\cal N2\)
\(\cal N24(n)\) An extension of \(\cal N24\) to \(n\)-element sets, \(n>1\).\(A=\bigcup B\), where \( B=\{b_i: i\in\omega\}\) is a pairwise disjoint setof \(n\)-element sets	\(\cal G\) is the group of all permutations of \(A\)which are permutations of \(B\); and \(S\) is the set of all finite subsets of\(A\)
\(\cal N26\) Brunner/Pincus Model, a variation of \(\cal N2\)	The set ofatoms \(A=\bigcup_{n\in\omega} P_n\), where the \(P_n\)'s are pairwisedisjoint denumerable sets; \(\cal G\) is the set of all permutations\(\sigma\) on \(A\) such that \(\sigma(P_n)=P_n\), for all \(n\in\omega\); and \(S\)is the set of all finite subsets of \(A\)