A new order for ideal sequential compactness
Abstract
Let I be an ideal on ω and X be a topological space. A sequence (xn)n∈ ω in X is I-convergent if there is x∈ X such that \n∈ ω:xn U\∈I for every open neighborhood U of x. We examine the following variant of sequential compactness associated with : X is BW(I) if for every sequence (xn)n∈ ω in X there is A such that (xn)n∈ A is I-convergent. We introduce a new preorder on ideals, denoted ≤BW, such that I≤BWJ implies that every BW(J) space is BW(I). Our main result states that under CH the above implication can be reversed in the case of Fσ ideals and . We compare ≤BW with the Katetov order and study the relation ≤BW among some well-known ideals (e.g. the van der Waerden ideal W consisting of all subsets of ω that do not contain arbitrary long finite arithmetic progressions). As a consequence, we answer two open questions posed by Filip\'ow and Tryba in [Top. App. 178 (2014), 438--452] concerning comparison of BW(W) with the class of sequentially compact spaces.
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