Solvable Number Field Extensions of Bounded Root Discriminant

Abstract

Let K be a number field and dK the absolute value of the discrimant of K/Q. We consider the root discriminant dL1[L:Q] of extensions L/K. We show that for any N>0 and any positive integer n, the set of length n solvable extensions of K with root discriminant less than N is finite. The result is motivated by the study of class field towers.