Explicit constructions of Diophantine tuples over finite fields
Abstract
A Diophantine m-tuple over a finite field Fq is a set \a1,…, am\ of m distinct elements in Fq* such that aiaj+1 is a square in Fq whenever i≠ j. In this paper, we study M(q), the maximum size of a Diophantine tuple over Fq, assuming the characteristic of Fq is fixed and q ∞. By explicit constructions, we improve the lower bound on M(q). In particular, this improves a recent result of Dujella and Kazalicki by a multiplicative factor.
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