Near coincidences and nilpotent division fields

Abstract

Let E/Q be an elliptic curve. We say that E has a near coincidence of level (n,m) if m n and Q(E[n]) = Q(E[m],ζn). We classify near coincidences of prime power level and use this result to give a classification of values of n for which Gal(Q(E[n])/Q) is a nilpotent group. Along the way we prove a Gauss-Wantzel analog for the elliptic curve E y2 = x3-x, showing that Q(E[n])/Q is constructible if and only if (n) is a power of 2. Assuming that there are no non-CM rational points on the modular curves Xns+(p) for primes p > 11, we show that Gal(Q(E[n])/Q) nilpotent implies that n is a power of 2 or n ∈ \ 3, 5, 6, 7, 15, 21 \.