Planting Kurepa trees and killing Jech-Kunen trees in a model by using one inaccessible cardinal
Abstract
By an omega1--tree we mean a tree of power omega1 and height omega1. Under CH and 2omega1> omega2 we call an omega1--tree a Jech--Kunen tree if it has kappa many branches for some kappa strictly between omega1 and 2omega1. In this paper we prove that, assuming the existence of one inaccessible cardinal, (1) it is consistent with CH plus 2omega1> omega2 that there exist Kurepa trees and there are no Jech--Kunen trees, (2) it is consistent with CH plus 2omega1= omega4 that only Kurepa trees with omega3 many branches exist.
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