Effective results for discriminant equations over finitely generated domains

Abstract

Let A be an integral domain with quotient field K of characteristic 0 that is finitely generated as a Z-algebra. Denote by D(F) the discriminant of a polynomial F∈ A[X]. Further, given a finite etale algebra , we denote by D/K(α ) the discriminant of α over K. For non-zero δ∈ A, we consider equations \[ D(F)=δ \] to be solved in monic polynomials F∈ A[X] of given degree n≥ 2 having their zeros in a given finite extension field G of K, and \[ D/K(α)=δ\,\, in α∈ O, \] where O is an A-order of , i.e., a subring of the integral closure of A in that contains A as well as a K-basis of . In our book ``Discriminant Equations in Diophantine Number Theory, which will be published by Cambridge University Press we proved that if A is effectively given in a well-defined sense and integrally closed, then up to natural notions of equivalence the above equations have only finitely many solutions, and that moreover, a full system of representatives for the equivalence classes can be determined effectively. In the present paper, we extend these results to integral domains A that are not necessarily integrally closed.