Hopf-Galois module structure of quartic Galois extensions of Q

Abstract

Given a quartic Galois extension L/Q of number fields and a Hopf-Galois structure H on L/Q, we study the freeness of the ring of integers OL as module over the associated order AH in H. For the classical Galois structure Hc, we know by Leopoldt's theorem that OL is AHc-free. If L/Q is cyclic, it admits a unique non-classical Hopf-Galois structure, whereas if it is biquadratic, it admits three such Hopf-Galois structures. In both cases, we obtain that freeness depends on the solvability in Z of certain generalized Pell equations. We shall translate some results on Pell equations into results on the AH-freeness of OL.