Moduli of lattice-polarized K3 surfaces and boundedness of Brauer groups

Abstract

Inspired by constructions over the complex numbers of Dolgachev and Alexeev-Engel, we define moduli stacks M(L,A)/Z of lattice-polarized K3 surfaces over arbitrary bases, paying particular attention to the open locus P(L,A)/Z of primitive lattice polarizations. We introduce the notion of very small ample cones a, after Alexeev and Engel's small cones, to construct smooth, separated stacks of lattice polarized K3 surfaces P(L,a)/Z[1/N] over suitable open subsets of Spec(Z). We add level structures, coming from classes in H2(X,μn), to build moduli stacks P[n](L,A)/Z with a natural action by P(L,A) Z/nZ whose associated quotient Q[n](L,A) contains an open substack Q(n)(L,A) whose points parametrize pairs K3 surfaces X such that Pic(X) L, together with a class α ∈ Br(X) of order n. When L has rank 19, we show that the coarse moduli space Q(L,a),C(n) is a union of quasi-projective curves, each isomorphic to an open subvariety of the quotient of the upper half plane by a discrete subgroup of SL2(R). Fixing a prime , we use this comparison to prove that the genus and the gonality of the components of Q(L,a),C(m) grows with m, and hence that they have finitely many points over number fields of bounded degree. As an application, we furnish a new proof of a result by Cadoret--Charles, showing uniform boundedness of the -primary torsion of Brauer groups of K3 surfaces over number fields varying in a 1-dimensional lattice-polarized family.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…