Solutions to the discrete Pompeiu problem and to the finite Steinhaus tiling problem
Abstract
Let K be a nonempty finite subset of the Euclidean space Rk (k 2). We prove that if a function f Rk C is such that the sum of f on every congruent copy of K is zero, then f vanishes everywhere. In fact, a stronger, weighted version is proved. As a corollary we find that every finite subset K of Rk having at least two elements is a Jackson set; that is, no subset of Rk intersects every congruent copy of K in exactly one point.
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