On some arithmetic properties of Siegel functions (II)

Abstract

Let K be an imaginary quadratic field with discriminant dK≤-7. We deal with problems of constructing normal bases between abelian extensions of K by making use of singular values of Siegel functions. First, we show that a criterion achieved from the Frobenius determinant relation enables us to find normal bases of ring class fields of orders of bounded conductors depending on dK over K. Next, denoting by K(N) the ray class field modulo N of K for an integer N≥2 we consider the field extension K(p2m)/K(pm) for a prime p≥5 and an integer m≥1 relatively prime to p and then find normal bases of all intermediate fields over K(pm) by utilizing Kawamoto's arguments. And, we further investigate certain Galois module structure of the field extension K(pnm)/K(pm) with n≥ 2, which would be an extension of Komatsu's work.