Infinite dimensional sequential compactness: Sequential compactness based on barriers

Abstract

We introduce a generalization of sequential compactness using barriers on ω extending naturally the notion introduced in [W. Kubi\'s and P. Szeptycki, On a topological Ramsey theorem, Canad. Math. Bull., 66 (2023), 156--165]. We improve results from [C. Corral and O. Guzm\'an and C. L\'opez-Callejas, High dimensional sequential compactness, Fund. Math.] by building spaces that are B-sequentially compact but no C-sequentially compact when the barriers B and C satisfy certain rank assumption which turns out to be equivalent to a Katetov-order assumption. Such examples are constructed under the assumption b =c. We also exhibit some classes of spaces that are B-sequentially compact for every barrier B, including some classical classes of compact spaces from functional analysis, and as a byproduct we obtain some results on angelic spaces. Finally we introduce and compute some cardinal invariants naturally associated to barriers.