We have the following indirect implication of form equivalence classes:
| Implication | Reference |
|---|---|
| 109 \(\Rightarrow\) 66 | clear |
| 66 \(\Rightarrow\) 67 |
Existence of a basis implies the axiom of choice, Blass, A. 1984a, Contemporary Mathematics |
| 67 \(\Rightarrow\) 126 | clear |
| 126 \(\Rightarrow\) 82 | note-76 |
| 82 \(\Rightarrow\) 83 |
Definitions of finite, Howard, P. 1989, Fund. Math. |
| 83 \(\Rightarrow\) 64 | The Axiom of Choice, Jech, 1973b, page 52 problem 4.10 |
| 64 \(\Rightarrow\) 127 |
Amorphe Potenzen kompakter Raume, Brunner, N. 1984b, Arch. Math. Logik Grundlagenforschung |
Here are the links and statements of the form equivalence classes referenced above:
| Howard-Rubin Number | Statement |
|---|---|
| 109: | Every field \(F\) and every vector space \(V\) over \(F\) has the property that each linearly independent set \(A\subseteq V\) can be extended to a basis. H.Rubin/J.~Rubin [1985], pp 119ff. |
| 66: | Every vector space over a field has a basis. |
| 67: | \(MC(\infty,\infty)\) \((MC)\), The Axiom of Multiple Choice: For every set \(M\) of non-empty sets there is a function \(f\) such that \((\forall x\in M)(\emptyset\neq f(x)\subseteq x\) and \(f(x)\) is finite). |
| 126: | \(MC(\aleph_0,\infty)\), Countable axiom of multiple choice: For every denumerable set \(X\) of non-empty sets there is a function \(f\) such that for all \(y\in X\), \(f(y)\) is a non-empty finite subset of \(y\). |
| 82: | \(E(I,III)\) (Howard/Yorke [1989]): If \(X\) is infinite then \(\cal P(X)\) is Dedekind infinite. (\(X\) is finite \(\Leftrightarrow {\cal P}(X)\) is Dedekind finite.) |
| 83: | \(E(I,II)\) Howard/Yorke [1989]: \(T\)-finite is equivalent to finite. |
| 64: | \(E(I,Ia)\) There are no amorphous sets. (Equivalently, every infinite set is the union of two disjoint infinite sets.) |
| 127: | An amorphous power of a compact \(T_2\) space, which as a set is well orderable, is well orderable. |
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