A Discrete Fourier Kernel and Fraenkel's Tiling Conjecture
Abstract
The set Bp,rq:=\nq/p+r n∈ Z \ with integers p, q, r) is a Beatty set with density p/q. We derive a formula for the Fourier transform Bp,rq(j):=Σn=1p e-2 π i j nq/p+r / q. A. S. Fraenkel conjectured that there is essentially one way to partition the integers into m>2 Beatty sets with distinct densities. We conjecture a generalization of this, and use Fourier methods to prove several special cases of our generalized conjecture.
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