2018
DOI: 10.18273/revint.v36n1-2018005
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A proof of Holsztyński theorem

Abstract: For a compact Hausdorff space, we denote by C(K) the Banach space of continuous functions defined in K with values in R or C. A well known result in Banach spaces of continuous functions is the Holsztyński theorem which establishes that if C(K) is isometric to a subspace of C(S), then K is a continuous image of S. The aim of this paper is to give an alternative proof of this result for extremely regular subspaces of C(K).

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“…e next result is proved in ( [24], Lemma 1) for compact spaces. e proof also works in the locally compact case, so we restate it as follows.…”
Section: On Extremely Regular Subspacesmentioning
confidence: 90%
See 1 more Smart Citation
“…e next result is proved in ( [24], Lemma 1) for compact spaces. e proof also works in the locally compact case, so we restate it as follows.…”
Section: On Extremely Regular Subspacesmentioning
confidence: 90%
“…e following result was proved for compact spaces in ( [24], eorem 2.4). By modifying slightly the proof showed in [24], we see that result also holds in the locally compact case. Theorem 6.…”
Section: On Isomorphisms From Extremely Regularmentioning
confidence: 94%