Algebraic number fields generated by an infinite family of monogenic trinomials

Abstract

For an infinite family of monogenic trinomials P(X) = X3 3rbX-b in Z X, arithmetical invariants of the cubic number field L = Q(θ), generated by a zero θ of P(X), and of its Galois closure N = L(d(L)) are determined. The conductor f of the cyclic cubic relative extension N/K, where K = Q(d(L)) denotes the unique quadratic subfield of N, is proved to be of the form 3eb with e∈ 1,2, which admits statements concerning primitive ambiguous principal ideals, lattice minima, and independent units in L. The number m of non-isomorphic cubic fields L1,…,Lm sharing a common discriminant d(Li) = d(L) with L is determined.