Cohen \(\cal M19(\aleph)\): Monro's Model II | Historical notes
Description: Let \(\cal M\) be a countable transitive model of \(ZF + V = L\) and let \(\aleph\) be a regular cardinal in \(\cal M\)
Parameter(s): This model depends on the following parameter(s): \(\alpha\), \(\alpha\): where \(\alpeh = \aleph_{\alpha}\) a regular cardinal
All Forms Known to be True in \(\cal M19(\aleph)\):
0,
All Forms Known to be False in \(\cal M19(\aleph)\):
430-p,
427,
391,
335-n,
334,
333,
292,
264,
239,
218,
202,
164,
160,
149,
147,
133,
114,
112,
109,
95-F,
91,
90,
89,
67,
66,
28-p,
1,
A minimial list of forms whose truth in this model imply all others that are true in this model: 0
Falses that are implied by others list: 91-160
References for models trues falses list: References Monro [1975] and Note 18.
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