19/09/11 14:30:28.79 z0Cctf8f.net
>>37 補足
>応用
>ZFの集合モデルは集合状かつ外延的である。
”集合状”かw、これ意味わからんと思ったが(^^
”Every set model of ZF is set-like and extensional. ”の「set-like」の直訳だね(^^;
<参考引用、該当英文箇所> (なお、Applicationも、”応用”より”適用”が適訳かもね。微妙だが)
URLリンク(en.wikipedia.org)
Mostowski collapse lemma
(抜粋)
Application
Every set model of ZF is set-like and extensional.
If the model is well-founded, then by the Mostowski collapse lemma it is isomorphic to a transitive model of ZF and such a transitive model is unique.
Saying that the membership relation of some model of ZF is well-founded is stronger than saying that the axiom of regularity is true in the model.
There exists a model M (assuming the consistency of ZF) who