An unexpected trace relation of CM points

Abstract

Let E/Q be an elliptic curve of conductor N=p2M where p is an odd prime not dividing M. Let Of be the order of conductor f (relatively prime to N) in an imaginary quadratic field K in which p is inert and such that the sign of the functional equation of E/K is -1. Associated to these data there is a Shimura curve of non-split Cartan level at p and a CM point of conductor f on it. We can also consider a CM point of conductor pf on another Shimura curve, using a split Cartan level at p. These curves admit parametrizations to E and taking the images of the CM points we obtain points on E defined over Hf and Hpf respectively (the ring class fields of conductor f and pf). We prove that these points arising from different Shimura curves satisfy a trace compatibility that is non-trivial if and only if the local sign of E/Q at p is +1.