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Inscribing cubes and covering by rhombic dodecahedra via equivariant topology
Published online by Cambridge University Press: 26 February 2010
Abstract
First, a special case of Knaster's problem is proved implying that each symmetric convex body in ℝ3 admits an inscribed cube. It is deduced from a theorem in equivariant topology, which says that there is no S4–equivariant map from SO(3) to S2, where S4 acts on SO(3) on the right as the rotation group of the cube, and on S2 on the right as the symmetry group of the regular tetrahedron. Some generalizations are also given.
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- Copyright © University College London 2000
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