Heegner points on Cartan non-split curves

Abstract

Let E be an elliptic curve of conductor N, and let K be an imaginary quadratic field such that the root number of E/K is -1. Let O be an order in K and assume that there exists an odd prime p, such that p2 N, and p is inert in O. Although there are no Heegner points on X0(N) attached to O, in this article we construct such points on Cartan non-split curves. In order to do that we give a method to compute Fourier expansions for forms in Cartan non-split curves, and prove that the constructed points form a Heegner system as in the classical case.