Von Neumann cardinal assignment |
The von Neumann cardinal assignment is a cardinal assignment which uses ordinal numbers. For a well-ordered set U, we
define its cardinal number to be the smallest ordinal number equinumerous to U. More precisely,
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That such an ordinal exists and is unique is guaranteed by the fact that U is well-orderable and that the class of
ordinals is well-ordered. With the full Axiom of choice, every set is
well-orderable, so every set has a cardinal; we order the cardinals using the inherited ordering from the ordinal numbers. This
is readily found to coincide with the ordering via . This is a well-ordering of cardinal numbers.
See also ordinal number, cardinal number, cardinal
assignment.
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