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Property C, Refinable Maps and Dimension Raising Maps
Abstract: Abstract. We show that refinable maps defined on compacta preserve Property C. H. Kato has proved the analogous result for weakly infinite dimensional spaces. We also show that if / is a map from a compact C space X onto a non C space Y, then the set of points in Y with an uncountable number of preimages is a space that does not have Property C.
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“…Garity, Hattori, Rohm, and Yamada (see [4,5,6,18,19]) have shown that in the presence of tr-compactness the products of spaces with property C behave in a regular way. Our examples, based on totally imperfect sets, lack compactness-like properties.…”
Section: Introductionmentioning
confidence: 99%
“…Garity, Hattori, Rohm, and Yamada (see [4,5,6,18,19]) have shown that in the presence of tr-compactness the products of spaces with property C behave in a regular way. Our examples, based on totally imperfect sets, lack compactness-like properties.…”
Section: Introductionmentioning
confidence: 99%
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