In mathematics, an unfoldable cardinal is a certain kind of large cardinal number.
Formally, a cardinal number ú is û-unfoldable if and only if for every transitive model M of cardinality ú of ZFC-minus-power set such that ú is in M and M contains all its sequences of length less than ú, there is a non-trivial elementary embedding j of M into a transitive model with the critical point of j being ú and j(ú) âÂÂ¥ û.
A cardinal is unfoldable if and only if it is an û-unfoldable for all ordinals û.
A cardinal number ú is strongly û-unfoldable if and only if for every transitive model M of cardinality ú of ZFC-minus-power set such that ú is in M and M contains all its sequences of length less than ú, there is a non-trivial elementary embedding j of M into a transitive model "N" with the critical point of j being ú, j(ú) âÂÂ¥ û, and V(û) is a subset of N. Without loss of generality, we can demand also that N contains all its sequences of length û.
Likewise, a cardinal is strongly unfoldable if and only if it is strongly û-unfoldable for all û.
These properties are essentially weaker versions of strong and supercompact cardinals, consistent with V = L. Many theorems related to these cardinals have generalizations to their unfoldable or strongly unfoldable counterparts. For example, the existence of a strongly unfoldable implies the consistency of a slightly weaker version of the proper forcing axiom.
Assuming V = L, the least unfoldable cardinal is greater than the least indescribable cardinal.<sup>p.14</sup> Assuming a Ramsey cardinal exists, it is less than the least Ramsey cardinal.<sup>p.3</sup>
A Ramsey cardinal is unfoldable and will be strongly unfoldable in L. It may fail to be strongly unfoldable in V, however.
In L, any unfoldable cardinal is strongly unfoldable; thus unfoldable and strongly unfoldable have the same consistency strength.
A cardinal k is ú-strongly unfoldable, and ú-unfoldable, if and only if it is weakly compact. A ú+ÃÂ-unfoldable cardinal is indescribable and preceded by a stationary set of totally indescribable cardinals.