I've seen in several places that that given a well-ordered set, $X$, any initial segment $S = \{x | x < a\}$ may not be order isomorphic to $X$.
Is it still possible that there is a non-order-preserving bijection between $S$ and $X$?
2026-04-29 12:31:30.1777465890
Cardinality of initial segments
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