On some p-adic Galois representations and form class groups

Abstract

Let K be an imaginary quadratic field of discriminant dK with ring of integers OK. When K is different from Q(-1) and Q(-3), we consider a certain specific model for the elliptic curve EK with j(EK)=j(OK) which is defined over Q(j(EK)). In this paper, for each positive integer N we compare the extension field of Q generated by the coordinates of N-torsion points on EK with the ray class field K(N) of K modulo NOK. By using this result we investigate the image of a p-adic Galois representation attached to EK for a prime p, in terms of class field theory. Second, we construct the definite form class group of discriminant dK and level N which is isomorphic to Gal(K(N)/Q).