Yang-Mills-Higgs connections on Calabi-Yau manifolds, II

TL;DR

This paper investigates Higgs and co-Higgs G-bundles on Calabi-Yau manifolds, showing semistability properties and characterizations of Calabi-Yau manifolds via tangent bundle stability and Higgs bundle behavior.

Contribution

It establishes that on Calabi-Yau manifolds, semistable Higgs or co-Higgs G-bundles imply semistability of the underlying principal G-bundle, and characterizes Calabi-Yau manifolds through tangent bundle stability.

Findings

Semistability of Higgs bundles implies semistability of principal G-bundles on Calabi-Yau manifolds.

Deformation retract of Higgs moduli space onto principal bundle moduli space.

Calabi-Yau manifolds characterized by tangent bundle semistability for all Kähler classes.

Abstract

In this paper we study Higgs and co-Higgs $G$-bundles on compact K\"ahler manifolds $X$. Our main results are: (1) If $X$ is Calabi-Yau, and $(E,\,\theta)$ is a semistable Higgs or co-Higgs $G$-bundle on $X$, then the principal $G$-bundle $E$ is semistable. In particular, there is a deformation retract of ${\mathcal M}_H(G)$ onto $\mathcal M(G)$, where $\mathcal M(G)$ is the moduli space of semistable principal $G$-bundles with vanishing rational Chern classes on $X$, and analogously, ${\mathcal M}_H(G)$ is the moduli space of semistable principal Higgs $G$-bundles with vanishing rational Chern classes. (2) Calabi-Yau manifolds are characterized as those compact K\"ahler manifolds whose tangent bundle is semistable for every K\"ahler class, and have the following property: if $(E,\,\theta)$ is a semistable Higgs or co-Higgs vector bundle, then $E$ is semistable.