Paradoxical decompositions of finite-dimensional non-Archimedean normed spaces
Abstract
We show that any normed space (Kn,\|·\|), n 2, over a field K equipped with a nontrivial non-Archimedean valuation admits a paradoxical decomposition using four pieces with respect to the group of its affine isometries, provided that the norm \|·\| is equivalent to the maximum norm. It follows that any finite-dimensional normed space (X,\|·\|) with X 2 over a complete non-Archimedean nontrivially valued field (K,|·|) is paradoxical using four pieces with respect to the group of its affine isometries.
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