Pairwise disjoint Moebius bands in space
Abstract
V.V.Grushin and V.P.Palamodov proved in 1962 that it is impossible to place in R3 uncountably many pairwise disjoint polyhedra each homeomorphic to the Moebius band. We generalize this result in two directions. First, we give a generalization of this result to tame subsets in RN, N≥slant 3. Second, we show that in case of R3 the theorem holds for arbitrarily topologically embedded (not necessarily tame) Moebius bands.
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