Independence of higher Kurepa hypotheses
classification
🧮 math.LO
keywords
kurepahypothesisgap-inaccessiblecardinalchangdifferentexistence
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We study the Generalized Kurepa Hypothesis introduced by Chang. We show that relative to the existence of an inaccessible cardinal the Gap-$n$-Kurepa hypothesis does not follow from the Gap-$m$-Kurepa hypothesis for $m$ different from $n$. The use of an inaccessible is necessary for this result.
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