Diophantine triples and K3 surfaces

Abstract: A Diophantine m-tuple with elements in the field K is a set of m non-zero (distinct) elements of K with the property that the product of any two distinct elements is one less than a square in K. Let X : (x 2 − 1)(y 2 − 1)(z 2 − 1) = k 2 , be an affine variety over K. Its K-rational points parametrize Diophantine triples over K such that the product of the elements of the triple that corresponds to the point (x, y, z, k) ∈ X(K) is equal to k. We denote by X the projective closure of X and for a fixed k by X k a… Show more