More on Cardinality Bounds Involving the Weak Lindel\"of degree

Abstract

We give several new bounds for the cardinality of a Hausdorff topological space X involving the weak Lindel\"of degree wL(X). In particular, we show that if X is extremally disconnected, then |X|≤ 2wL(X)π(X)(X), and if X is additionally power homogeneous, then |X|≤ 2wL(X)π(X). We also prove that if X is an almost Lindel\"of space with a strong Gδ-diagonal of rank 2, then |X|≤ 20; that if X is a star-cdc space with a Gδ-diagonal of rank 3, then |X| 20; and if X is any normal star-cdc space X with a Gδ-diagonal of rank 2, then |X|≤ 20. Several improvements of results in [9] are also given. We show that if X is locally compact, then |X|≤ wL(X)(X) and that |X|≤ wL(X)t(X) if X is additionally power homogeneous. We also prove that |X|≤ 2c(X)t(X)wL(X) for any space with a π-base whose elements have compact closures and that the stronger inequality |X|≤ wL(X)c(X)t(X) is true when X is locally H-closed or locally Lindel\"of.

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