Xi-Zhao Model Preserves WD Spaces
Abstract
For a T1 space X, Zhao and Xi constructed a dcpo model P, where P is a bounded complete algebraic poset model of X. In this paper, we formulate the closed WD subsets of the maximal point space Max(P) and the Scott space P, and then prove that X is a WD space if and only if P is a WD space. It is also shown that the sobrification Xs (resp., the well-filtered reflection Xw) of X can be embedded into the sobrification Ps (resp., the well-filtered reflection Pw) of P as a saturated subspace. Finally, we introduce two new concepts `` H-model spaces" and ``weak H-model spaces", and provide a general framework to prove that such T1 spaces can be preserved by Xi-Zhao dcpo models.
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