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Product representations of polynomials over finite fields

Published 23 Jan 2026 in math.CO and math.NT | (2601.16657v1)

Abstract: Erdős, Sárközy, and Sós studied the asymptotics of the maximum size of a subset of ${1,2,\ldots, N}$ such that it does not contain $k$ distinct elements whose product is a perfect square. More generally, Verstraëte proposed a conjecture regarding the asymptotic behavior of the same quantity with the set of perfect squares replaced by the value set of a polynomial in $\mathbb{Z}[x]$. In this paper, we study a finite field analogue of Verstraëte's conjecture.

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