Rosenthal compacta that are premetric of finite degree
Abstract
We show that if a separable Rosenthal compactum K is an n-to-one preimage of a metric compactum, but it is not an n-1-to-one preimage, then K contains a closed subset homeomorphic to either the n-Split interval Sn(I) or the Alexandroff n-plicate Dn(2N). This generalizes a result of the third author that corresponds to the case n=2.
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