An analogue of Gromov's waist theorem for coloring the cube
classification
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math.AT
keywords
cubessmallcubeanaloguecolorcoloringcolorscomponent
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It is proved that if we partition a $d$-dimensional cube into $n^d$ small cubes and color the small cubes into $m+1$ colors then there exists a monochromatic connected component consisting of at least $f(d, m) n^{d-m}$ small cubes.
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