Statement:
If \((A,\le)\) is a partial ordering that is not a well ordering, then there is no set \(B\) such that \((B,\le)\) (the usual injective cardinal ordering on \(B\)) is isomorphic to \((A,\le)\).
Mathias [1979], p 120.
Howard_Rubin_Number: 59-le
Parameter(s): This form depends on the following parameter(s): \(\lt\), \(\le\): partial order
This form's transferability is: Unknown
This form's negation transferability is: Negation Transferable
Article Citations:
Mathias-1979: A survey of recent results in set theory
Book references
Note connections: