Furstenberg--S\'ark\"ozy theorem over number fields
Abstract
We introduce the notion of intersective polynomials having coefficients in the ring of integers OK of a number field K, and define a notion of upper density of subsets of OK. We prove that given any intersective polynomial p(x) over OK, every subset A of OK of positive upper density contains two distinct elements whose difference is equal to p(x) for some element x in OK. Moreover, we obtain a quantitative version of this result. The proof is motivated by an argument due to Lucier, and the Fourier-free proof of the Furstenberg--S\'ark\"ozy theorem over the integers by Green, Tao and Ziegler.
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