Abstract
Laczkovich proved thatif bounded subsets $A$ and $B$ of $\mathbb{R}^k$ have the same nonzero Lebesgue measure and the upper box dimension of the boundary of each set is less than $k$, then there is a partitionof $A$ into finitely many parts that can be translated to form a partitionof $B$. Here we show that it can be additionally required that each part is both Baire and Lebesgue measurable. As special cases, this gives measurable and translation-only versions of Tarski's circle squaringand Hilbert's third problem.
Citation
Łukasz Grabowski. András Máthé. Oleg Pikhurko. "Measurable circle squaring." Ann. of Math. (2) 185 (2) 671 - 710, March 2017. https://doi.org/10.4007/annals.2017.185.2.6
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