Hitchin and Calabi-Yau integrable systems via variations of Hodge structures

TL;DR

This paper explores the relationship between variations of Hodge structures and complex integrable systems, demonstrating that Hitchin systems for various Lie groups can be viewed as Calabi-Yau integrable systems using sheaf-theoretic methods.

Contribution

It provides a criterion for when variations of Hodge structures induce integrable systems and extends known results about Hitchin systems to all Dynkin types using a sheaf-theoretic approach.

Findings

Hitchin systems for all simple Lie groups are isomorphic to Calabi-Yau integrable systems.

The sheaf-theoretic approach enables new insights into the structure of complex integrable systems.

Extension of results from ADE types to B, C, F4, and G2 types.

Abstract

A complex integrable system determines a family of complex tori over a Zariski-open and dense subset in its base. This family in turn yields an integral variation of Hodge structures of weight $\pm 1$. In this paper, we study the converse of this procedure. Starting from an integral variation of Hodge structures of weight $\pm 1$, we give a criterion for when its associated family of complex tori carries a Lagrangian structure, i.e. for when it can be given the structure of an integrable system. This sheaf-theoretic approach to (the smooth parts of) complex integrable systems enables us to apply powerful tools from Hodge and sheaf theory to study complex integrable systems. We exemplify the usefulness of this viewpoint by proving that the degree zero component of the Hitchin system for any simple adjoint or simply-connected complex Lie group $G$ is isomorphic to a non-compact Calabi-Yau integrable system over a Zariski-open and dense subset in the corresponding Hitchin base. In particular, we recover previously known results for the case where $G$ has a Dynkin diagram of type ADE and extend them to the remaining Dynkin types $\mathrm{B}_k$, $\mathrm{C}_k$, $\mathrm{F}_4$ and $\mathrm{G}_2$.