An intriguing hyperelliptic Shimura curve quotient of genus 16

Abstract

Let F be the maximal totally real subfield of Q(ζ32), the cyclotomic field of 32nd roots of unity. Let D be the quaternion algebra over F ramified exactly at the unique prime above 2 and 7 of the real places of F. Let O be a maximal order in D, and X0D(1) the Shimura curve attached to O. Let C = X0D(1)/ wD , where wD is the unique Atkin-Lehner involution on X0D(1). We show that the curve C has several striking features. First, it is a hyperelliptic curve of genus 16, whose hyperelliptic involution is exceptional. Second, there are 34 Weierstrass points on C, and exactly half of these points are CM points; they are defined over the Hilbert class field of the unique CM extension E/F of class number 17 contained in Q(ζ64), the cyclotomic field of 64th roots of unity. Third, the normal closure of the field of 2-torsion of the Jacobian of C is the Harbater field N, the unique Galois number field N/Q unramified outside 2 and ∞, with Galois group Gal(N/Q) F17 = Z/17Z (Z/17Z)×. In fact, the Jacobian Jac(X0D(1)) has the remarkable property that each of its simple factors has a 2-torsion field whose normal closure is the field N. Finally, and perhaps the most striking fact about C, is that it is also hyperelliptic over Q.