CM-points and Lattice counting on arithmetic compact Riemann surfaces

Abstract

Let X(D,1) =(D,1) H denote the Shimura curve of level N=1 arising from an indefinite quaternion algebra of fixed discriminant D. We study the discrete average of the error term in the hyperbolic circle problem over Heegner points of discriminant d <0 on X(D,1) as d -∞. We prove that if |d| is sufficiently large compared to the radius r ≈ X of the circle, we can improve on the classical O(X2/3)-bound of Selberg. Our result extends the result of Petridis and Risager for the modular surface to arithmetic compact Riemann surfaces.