2013
DOI: 10.1007/s10587-013-0010-8
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A non-archimedean Dugundji extension theorem

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Cited by 7 publications
(4 citation statements)
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“…The earlier techniques and approaches to the purely topological versions of the above problems cannot be carried over to the definable settings because, among others, non-Archimedean geometry over non-locally compact fields suffers from lack of definable Skolem functions. Perhaps the strongest, purely topological, non-Archimedean results on retractions are those from the papers [11,17] recalled below.…”
Section: ] and [4 Section 52])mentioning
confidence: 99%
“…The earlier techniques and approaches to the purely topological versions of the above problems cannot be carried over to the definable settings because, among others, non-Archimedean geometry over non-locally compact fields suffers from lack of definable Skolem functions. Perhaps the strongest, purely topological, non-Archimedean results on retractions are those from the papers [11,17] recalled below.…”
Section: ] and [4 Section 52])mentioning
confidence: 99%
“…Perhaps the strongest, purely topological, non-Archimedean results on retractions are those from the papers [22,28] recalled below respectively. Theorem 4.…”
Section: Remarkmentioning
confidence: 99%
“…Furthermore, the earlier techniques and approaches to the purely topological versions of those problems cannot be carried over to the definable settings because, among others, non-Archimedean geometry over non-locally compact fields suffers from lack of definable Skolem functions. For a more detailed discussion about their classical, purely topological counterparts (see e.g., [20][21][22]), we refer the reader to our paper [18].…”
Section: Introductionmentioning
confidence: 99%
“…(5) Every locally compact totally disconnected orderable space is retractifiable. Kąkol-Kubzdela-Śliwa [33] showed that every compact metrizable subspace Y of an ultraregular space X is a retract of X.…”
Section: Introductionmentioning
confidence: 99%