Point counts, automorphisms, and gonalities of Shimura curves

Abstract

We implement an algorithm to compute the number of points over finite fields for the Shimura curves X0D(N) over Q and their Atkin--Lehner quotients. Our computations identify 116 such quotients over finite fields (out of 783514 tested) that attain a number of rational points exceeding that of any previously known curve of the same genus over the same finite field. To illustrate the utility of our point counts algorithm in addressing arithmetic questions, we prove that all automorphisms are Atkin--Lehner for 9288 of the 10609 curves X0D(N) of genus g > 2 with D the discriminant of an indefinite quaternion algebra over Q, N a squarefree positive integer coprime to D, and DN≤ 10000, and we determine all tetragonal and geometrically tetragonal curves X0D(N) up to a small number of possible exceptions.