Hopf-Galois module structure of monogenic orders in cubic number fields

Abstract

For a cubic number field L, we consider the Z-order in L of the form Z[α], where α is a root of a polynomial of the form x3-ax+b and a,b∈Z are integers such that vp(a)≤ 2 or vp(b)≤ 3 for all prime numbers p. We characterize the freeness of Z[α] as a module over its associated order in the unique Hopf-Galois structure H on L in terms of the solvability of at least one between two generalized Pell equations in terms of a and b. We determine when the equality OL=Z[α] is satisfied in terms of congruence conditions for a and b. For such cases, we specialize our result so as to obtain criteria for the freeness of OL as a module over its associated order in H.