Transfinite dimensions Indm

Fedorchuk, Vitaly V.

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Publication date

October 2008

DOI

10.1016/j.topol.2007.05.027

Publisher

Published by Elsevier B.V.

Abstract

AbstractWe investigate dimensions Indm (m is an integer ⩾2 or m=∞) introduced in [V.V. Fedorchuk, Weakly infinite-dimensional spaces, Uspekhi Mat. Nauk 62 (2) (2007) 109–164]. These dimensions have intrinsic properties similar to those of the classical transfinite dimension Ind=Ind2. In particular,(1) IndmX<ω1 for every countable dimensional metrizable compactum X;(2) every normal space X has a compactification bX with wbX=wX and IndmbX⩽IndmX.Moreover, if IndX is defined (respectively IndX is finite), then IndmX is defined (respectively IndmX is finite) for every m

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Transfinite dimensions Indm

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Transfinite dimensions Indm

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