On discriminants of minimal polynomials of the Ramanujan tn class invariants

Abstract

We study the discriminants of the minimal polynomials Pn of the Ramanujan tn class invariants, which are defined for positive integers n1124. The historical precedent for doing so comes from Gross and Zagier, which is known for computing the prime factorizations of certain resultants and discriminants of the Hilbert class polynomials Hn. We show that (Pn) divides (Hn) with quotient a perfect square, and as a consequence, we explicitly determine the sign of (Pn) based on the class group structure of the order of discriminant -n. We also show that the discriminant of the number field generated by j(-1+-n2), where j is the j-invariant, divides (Pn). Moreover, we show that 3 never divides (Pn) for all squarefree positive integers n1124.