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Admissible suslin cardinals in l(r)
Journal of Symbolic Logic 56 (1):260 - 275 (1991)
Abstract
Assuming AD + (V = L(R)), it is shown that for κ an admissible Suslin cardinal, o(κ) (= the order type of the stationary subsets of κ) is "essentially" regular and closed under ultrapowers in a manner to be made precise. In particular, o(κ) ≫ κ +, κ ++ , etc. It is conjectured that this characterizes admissibility for L(R)Other Versions
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