Normality in the square of the Sorgenfrey Line
Abstract
We consider sets of reals X endowed with the Sorgenfrey lower limit topology denoted X[≤]. Przymusi\'nski proved that if X is a Q-set then (X[≤])2 is normal. While the converse is not in general true we consider examples of sets of the reals for which (X[≤])2 is normal or just pseudo-normal. For example, if X is a λ set, then (X[≤])2 is pseudo-normal but assuming CH there is an X concentrated on a countable dense subset (so not a λ-set) but still (X[≤])2 is normal.
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