The Banach-Tarski paradox in complete discretely valued fields

Abstract

We prove some results related to the classical Banach--Tarski paradox in the setting of a field K that is complete with respect to a discrete non-Archimedean valuation (e.g., when K is the field Qp of p-adic numbers for a prime p). Namely, the field K, as well as all balls and spheres in K, admit a paradoxical decomposition with respect to the isometry group of K. Such decompositions can be realized using pieces with the Baire property if K is separable. Under the additional assumption of local compactness of K (e.g., when K=Qp), any two bounded subsets of K with nonempty interiors are equidecomposable with respect to the isometry group of K. Our results complete the study of paradoxical decompositions in the non-Archimedean setting, addressing the one-dimensional case and building on earlier work for higher-dimensional normed spaces over K with respect to groups of affine isometries.