Diophantine m-tuples in finite fields and modular forms

Abstract

For a prime p, a Diophantine m-tuple in Fp is a set of m nonzero elements of Fp with the property that the product of any two of its distinct elements is one less than a square. In this paper, we present formulas for the number N(m)(p) of Diophantine m-tuples in Fp for m=2,3 and 4. Fourier coefficients of certain modular forms appear in the formula for the number of Diophantine quadruples. We prove that asymptotically N(m)(p)=12m 2 pmm! + o(pm), and also show that if p>22m-2m2, then there is at least one Diophantine m-tuple in Fp.