Well-ordered set: Revision history

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25 March 2024

1 September 2023

31 August 2023

  • curprev 14:3114:31, 31 August 2023RhubarbJayde talk contribs 2,771 bytes +940 No edit summary undo Tag: Visual edit
  • curprev 14:2114:21, 31 August 2023RhubarbJayde talk contribs 1,831 bytes +1,831 Created page with "A well-ordered set is a set \(X\) endowed with a relation \(\leq\) on \(X^2\), called a well-order, so that \(\leq\) has the following properties * Transitivity: If \(a \leq b\) and \(b \leq c\) then \(a \leq c\). * Antisymmetry: If \(a \leq b\) and \(b \leq a\), then \(a = b\). * Totality: For all \(a, b\), either \(a \leq b\) or \(b \leq a\). * Well-foundedness: For any \(S \subseteq X\), there is \(s \in S\) so that, for all \(t \in S\), \(s \leq t\). * Reflexivity:..." Tag: Visual edit
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