SHELAH CARDINAL - Encyclopedia Information

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In axiomatic set theory, Shelah cardinals are a kind of large cardinals. A cardinal $\kappa$ is called Shelah iff for every $f:\kappa \rightarrow \kappa$ , there exists a transitive class $N$ and an elementary embedding $j:V\rightarrow N$ with critical point $\kappa$ ; and $V_{j(f)(\kappa )}\subset N$ .

A Shelah cardinal has a normal ultrafilter containing the set of weakly hyper-Woodin cardinals below it.

References

Ernest Schimmerling, Woodin cardinals, Shelah cardinals and the Mitchell-Steel core model, Proceedings of the American Mathematical Society 130/11, pp. 3385-3391, 2002, online

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From Wikipedia, the free encyclopedia

In axiomatic set theory, Shelah cardinals are a kind of large cardinals. A cardinal $\kappa$ is called Shelah iff for every $f:\kappa \rightarrow \kappa$ , there exists a transitive class $N$ and an elementary embedding $j:V\rightarrow N$ with critical point $\kappa$ ; and $V_{j(f)(\kappa )}\subset N$ .

A Shelah cardinal has a normal ultrafilter containing the set of weakly hyper-Woodin cardinals below it.

References

Ernest Schimmerling, Woodin cardinals, Shelah cardinals and the Mitchell-Steel core model, Proceedings of the American Mathematical Society 130/11, pp. 3385-3391, 2002, online

This set theory-related article is a stub. You can help Wikipedia by expanding it.

Retrieved from " https://en.wikipedia.org/?title=Shelah_cardinal&oldid=1211749340"

Hidden category:

All stub articles

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