Inverse limits of CM points on certain Shimura varieties

Abstract

Let N be a positive integer, and let D0 or 14 be a negative integer. We define the sets CM(D,\,Y1(N)) and CM(D,\,Y(N)) as subsets of the Shimura varieties Y1(N) and Y(N), respectively, consisting of CM points of discriminant D that are primitive modulo N. By using the theory of definite form class groups, we show that the inverse limits equation* N\,CM(D,\,Y1(N))and N\,CM(D,\,Y(N)) equation* naturally inherit group structures isomorphic to Gal(Kab/Q) and Gal(Kab(t1/∞)/Q(t)), respectively, where K=Q(D) and t is a transcendental number. These results provide an explicit and geometric interpretation of class field theory in terms of inverse limits of CM points on the associated Shimura varieties.