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A maximal extension of the Bloom-Maynard bound for sets with no square differences (2303.03345v1)

Published 6 Mar 2023 in math.NT

Abstract: We show that if $h\in\mathbb{Z}[x]$ is a polynomial of degree $k$ such that the congruence $h(x)\equiv0\pmod{q}$ has a solution for every positive integer $q$, then any subset of ${1,2,\ldots,N}$ with no two distinct elements with difference of the form $h(n)$, with $n$ positive integer, has density at most $(\log N){-c\log\log\log N}$, for some constant $c$ that depends only on $k$. This improves on the best bound in the literature, due to Rice, and generalizes a recent result of Bloom and Maynard.

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