On C-embedded subspaces of the Sorgenfrey plane
Abstract
We prove that every C*-embedded subset of is a hereditarily Baire subspace of R2. We also show that for a subspace E⊂eq\(x,-x):x∈ R\ of the Sorgenfrey plane S2 the following conditions are equivalent: (i) E is C-embedded in S2; (ii) E is C*-embedded in S2; (iii) E is a countable Gδ-subspace of R2 and (iv) E is a countable functionally closed subspace of S2.
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