An absolute bound for generalized Diophantine tuples over polynomial rings

Abstract

Let F be an algebraically closed field of characteristic 0. Let k≥ 2 be an integer, and let n∈ F[x]\0\. We study generalized Diophantine tuples A⊂ F[x] with property Dk(n), meaning that ab+n is a k-th power in F[x] for all distinct elements a,b∈ A. For k18, we prove that every such tuple satisfies |A|6, except for the necessary exceptional family in which n=s2 is a k-th power and A⊂ sF. This bound is absolute: it is independent of both n and deg n. Our proof develops a new method for studying polynomial Diophantine tuples, combining a determinant criterion, generalizations of the Mason--Stothers theorem, and the Combinatorial Nullstellensatz. We also record a conditional analogue for generalized Diophantine tuples over the integers.

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