Two-cardinal Kurepa Hypotheses
Abstract
We consider the two-cardinal Kurepa Hypothesis KH(,λ). We observe that if ≤λ<μ are infinite cardinals then KH(,λ)KH(,μ)→KH(λ+,μ), and show that in some sense this is the only ZFC constraint. The case of singular λ and its relation to Chang's Conjecture and scales is discussed. We also extend an independence result about Kurepa and Aronszajn trees due to Cummings to the case of successors of singular cardinal.
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