Global variations of Hodge structures of maximal dimension

TL;DR

This paper establishes a new, sharper linear bound on the dimension of period map images for certain Hodge structures, improving upon previous quadratic bounds and demonstrating cases where the bound is attained.

Contribution

It introduces a novel linear bound on the dimension of period map images for variations of Hodge structures with level at least 3, surpassing prior quadratic bounds.

Findings

New linear bound on period map image dimension

Example demonstrating the bound's sharpness

Comparison showing improvement over previous bounds

Abstract

We derive a new bound on the dimension of images of period maps of global pure polarized integral variations of Hodge structures with generic Hodge datum of level at least 3. When the generic Mumford-Tate domain of the variation is a period domain parametrizing Hodge structures with given Hodge numbers, we prove that the new bound is at worst linear in the Hodge numbers, while previous known bounds were quadratic. We also give an example where our bound is significantly better than previous ones and sharp in the sense that there is a variation of geometric origin whose period image has maximal dimension (i.e. equal to the new bound).