Abstract
Three classical constructions of Lebesgue nonmeasurable sets on the real line \(\mathbb{R}\) are envisaged from the point of view of the thickness of those sets. It is also shown, within \({\bf ZF}~\&~{\bf DC}\) theory, that the existence of a Lebesgue nonmeasurable subset of \(\mathbb{R}\) implies the existence of a partition of \(\mathbb{R}\) into continuum many thick sets.
Citation
A. B. Kharazishvili. "On Partitions of the Real Line into Continuum Many Thick Subsets." Real Anal. Exchange 39 (2) 459 - 468, 2013/2014.
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