Arithmetic geometry of the moduli stack of Weierstrass fibrations over P1

Abstract

Coarse moduli spaces of Weierstrass fibrations over the (unparameterized) projective line were constructed by the classical work of [Miranda] using Geometric Invariant Theory. In our paper, we extend this treatment by using results of [Romagny] regarding group actions on stacks to give an explicit construction of the moduli stack Wn of Weierstrass fibrations over an unparameterized P1 with discriminant degree 12n and a section. We show that it is a smooth algebraic stack and prove that for n ≥ 2, the open substack Wmin,n of minimal Weierstrass fibrations is a separated Deligne-Mumford stack over any base field K with char(K) ≠ 2,3 and not dividing n. Arithmetically, for the moduli stack Wsf,n of stable Weierstrass fibrations, we determine its motive in the Grothendieck ring of stacks to be \Wsf,n\ = L10n - 2 in the case that n is odd, which results in its weighted point count to be \#q(Wsf,n) = q10n - 2 over Fq. In the appendix, we show how our methods can be applied similarly to the classical work of [Silverman] on coarse moduli spaces of self-maps of the projective line, allowing us to construct the natural moduli stack and to compute its motive.