Critical L-values for some quadratic twists of Gross curves

Abstract

Let K= Q(-q), where q is a prime congruent to 3 modulo 4. Let A=A(q) denote the Gross curve. Let E=A(-β) denote its quadratic twist, with β=-q. The curve E is defined over the Hilbert class field H of K. We use Magma to calculate the values L(E/H,1) for all such q's up to some reasonable ranges (different for q 7 \, mod \, 8 and q 3 \, mod \, 8). All these values are non-zero, and using the Birch and Swinnerton-Dyer conjecture, we can calculate hypothetical orders of (E/H) in these cases. Our calculations extend those given by J. Choi and J. Coates [ Iwasawa theory of quadratic twists of X0(49), Acta Mathematica Sinica(English Series) 34 (2017), 19-28] for the case q=7.