Hartogs number

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After German-Jewish mathematician Template:W (1874–1943).

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1. Template:Lb For a given set X, the cardinality of the least ordinal number α such that there is no injection from α into X.
   • 1973 [North-Holland], Template:W, The Axiom of Choice, 2013, Dover, page 160,

     Let ${\displaystyle 𝔭}$ be an infinite cardinal, ${\displaystyle |X|=𝔭}$ and let ${\displaystyle \mathrm{\aleph }=\mathrm{\aleph }(𝔭)}$ be the Hartogs number of ${\displaystyle 𝔭}$.

   • 1995, The Bulletin of Symbolic Logic, Volume 1, Template:W, page 139,

     If the Power Set Axiom is replaced by "${\displaystyle \mathrm{\aleph }(x)}$ is bound for every x" where

     ${\displaystyle \mathrm{\aleph }(x)=\{a|\mathrm{\exists }f(f}$ is one-to-one function from ${\displaystyle a}$ into ${\displaystyle x)\}}$,

     then the theory is denoted by ZFH (H stands for Hartogs' Number).

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• The Hartogs number is a cardinal number representing the size of the ordinal number α (regarded as a set).
• The definition is worded such that X does not need to have a well-order.

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