Lemma 4. 3.11. Let K be a cyclic sextic CM field with h∗K = 4 and let Φ be a primitive CM type of K. Let F be the totally real cubic subfield 2 r of K. Let p0F = p1p2p3 and pi0K = Pi . Suppose I0(Φ ) = IKr . Then there is ti ∈ F⨮0 such that phF = ti0F for each i ∈ {1, 2, 3} and of order 4.
Appears in 2 contracts
Sources: Not Applicable, Not Applicable