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    If there are κ inaccessible cardinals below κ, then κ is ... — Carmelics
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    Supports→A weakly compact inaccessible cardinal cannot be the first, second, or any finitely indexed inaccessible cardinal

    If there are κ inaccessible cardinals below κ, then κ is exceedingly large and surpasses any finite position in the inaccessible hierarchy

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    A weakly compact inaccessible cardinal cannot be the first, second, or any finit...If κ is inaccessible and weakly compact, then there exists a set of κ inaccessib...

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    Having κ many inaccessibles below κ places κ far beyond any finitely i...89%If κ is inaccessible and weakly compact, then there exists a set of κ ...88%If κ is inaccessible and weakly compact, then there is a set of κ many...87%M thinks there is a strongly inaccessible cardinal (namely κ) below j(...86%

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    (3.3) Suppose κ is inaccessible. Then κ is weakly compact  ⇔  L(κ,ω) is weakly κ-compact. Also, Also κ is weakly compact ⇒ there is a set of κ inaccessibles before κ. Thus a weakly compact inaccessible cardinal is exceedingly large; in particular it cannot be the first, second, …, nth, … inaccessible.

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