Around the support problem for Hilbert class polynomials

Abstract

Let HD(T) denote the Hilbert class polynomial of the imaginary quadratic order of discriminant D. We study the rate of growth of the greatest common divisor of HD(a) and HD(b) as |D| ∞ for a and b belonging to various Dedekind domains. We also study the modular support problem: if for all but finitely many D every prime ideal dividing HD(a) also divides HD(b), what can we say about a and b? If we replace HD(T) by Tn-1 and the Dedekind domain is a ring of S-integers in some number field, then these are classical questions that have been investigated by Bugeaud-Corvaja-Zannier, Corvaja-Zannier, and Corrales-Rodrig\'a\~nez-Schoof.