Two Families of Monogenic S4 Quartic Number Fields

Abstract

Consider the integral polynomials fa,b(x)=x4+ax+b and gc,d(x)=x4+cx3+d. Suppose fa,b(x) and gc,d(x) are irreducible, b a, and the integers b, d, 256d-27c4, and 256b3-27a4(256b3,27a4) are all square-free. Using the Montes algorithm, we show that a root of fa,b(x) or gc,d(x) defines a monogenic extension of Q and serves as a generator for a power integral basis of the ring of integers. In fact, we show monogeneity for slightly more general families. Further, we obtain lower bounds on the density of polynomials generating monogenic S4 fields within the families fb,b(x) and g1,d(x).