Tiling the field Qp of p-adic numbers by a function
Abstract
This study explores the properties of the function which can tile the field Qp of p-adic numbers by translation. It is established that functions capable of tiling Qp is by translation uniformly locally constancy. As an application, in the field Qp, we addressed the question posed by H. Leptin and D. M\"uller, providing the necessary and sufficient conditions for a discrete set to correspond to a uniform partition of unity. The study also connects these tiling properties to the Fuglede conjecture, which states that a measurable set is a tile if and only if it is spectral. The paper concludes by characterizing the structure of tiles in \(Qp × Z/2Z\), proving that they are spectral sets.
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