On Monogenicity of Relative Cubic-Power Pure Extensions

“…Parametrized families of monogenic polynomials have been given in [6,22]. In the Sections § § 3, 4 of the present article, we investigate the arithmetic of the cubic number field L = Q(θ) generated by a zero θ of a polynomial (1.1) P (X) = X 3 + aX − b, with a = σ • 3rb, sign σ ∈ {−1, +1}, and r, b ∈ N, which arises by specialization from the trinomials X p n + aX p s − b, p ∈ P, n > s ≥ 0, in [6].…”

Algebraic number fields generated by an infinite family of monogenic trinomials

“…Parametrized families of monogenic polynomials have been given in [6,22]. In the Sections § § 3, 4 of the present article, we investigate the arithmetic of the cubic number field L = Q(θ) generated by a zero θ of a polynomial (1.1) P (X) = X 3 + aX − b, with a = σ • 3rb, sign σ ∈ {−1, +1}, and r, b ∈ N, which arises by specialization from the trinomials X p n + aX p s − b, p ∈ P, n > s ≥ 0, in [6].…”

Algebraic number fields generated by an infinite family of monogenic trinomials

Algebraic number fields generated by an infinite family of monogenic trinomials

Tower Index formula and monogenecity