Supercompact cardinal

In set theory, a supercompact cardinal a type of large cardinal. They display a variety of reflection properties.

Formal definition

If λ is any ordinal, κ is λ-supercompact means that there exists an elementary embedding "j" from the universe "V" into a transitive inner model "M" with critical point κ, "j"(κ)>λ and

: ${ }^lambda Msubseteq M$

That is, "M" contains all of its λ-sequences. Then κ is supercompact means that it is λ-supercompact for all ordinals λ.

Alternatively, an uncountable cardinal κ is supercompact if for every "A" such that |"A"| ≥ κ there exists a normal measure on ["A"] ^{< κ}.

["A"] ^{< κ} is defined as follows:

: $[A] ^{< kappa} := {X subseteq A| |X| < kappa}$ .

Properties

Supercompact cardinals have reflection properties. For example, if κ is supercompact and the Generalized Continuum Hypothesis holds below κ then it holds everywhere.

Finding a canonical inner model for supercompact cardinals is one of the major problems of inner model theory.

References

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Supercompact cardinal

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