On k-ranks of topological spaces
Abstract
In this paper, the concepts of K-subset systems and k-well-filtered spaces are introduced, which provide another uniform approach to d-spaces, s-well-filtered spaces (i.e., US-admissibility) and well-filtered spaces. We prove that the k-well-filtered reflection of any T0 space exists. Meanwhile, we propose the definition of k-rank, which is an ordinal that measures how many steps from a T0 space to a k-well-filtered space. Moreover, we derive that for any ordinal α, there exists a T0 space whose k-rank equals to α. One immediate corollary is that for any ordinal α, there exists a T0 space whose d-rank (respectively, wf-rank) equals to α.
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