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Article

Gryzlov, A.
Cardinal invariants and compactifications. (English). Commentationes Mathematicae Universitatis Carolinae, vol. 35 (1994), issue 2, pp. 403-408
MSC: 54A25, 54D35 | MR 1286587 | Zbl 0807.54005
Keywords:
Čech-Stone compactification; cardinal invariants
Summary:
We prove that every compact space $X$ is a Čech-Stone compactification of a normal subspace of cardinality at most $d(X)^{t(X)}$, and some facts about cardinal invariants of compact spaces.
References:
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