A note on the procedure to find the generic polynomial of a quotient (closely following Adelmann)

Abstract

There are 3 examples in these notes. The first one is the standard example of the cubic resolvent of a quartic. The second example is exactly from Adelmann Adelmann and gives a defining polynomial corresponding to the unique S4-quotient of GL2(Z/4Z). The splitting field of the Adelmann polynomial over Q is a subfield of the 4-division field of an elliptic curve, that contains the 2-division field of the elliptic curve. The third example is new and needed in the study of the field theory of quaternion origami. Associated to an elliptic curve defined over Q, with a rational point, is a degree 8 polynomial whose Galois group is a subgroup of Hol(Q8). Three defining polynomials corresponding to the three S4-quotients of Hol(Q8) are given.