Yang-Mills connections on compact complex tori

Abstract

Let G be a connected reductive complex affine algebraic group and K⊂ G a maximal compact subgroup. Let M be a compact complex torus equipped with a flat K\"ahler structure and (EG ,θ) a polystable Higgs G-bundle on M. Take any C∞ reduction of structure group EK ⊂ EG to the subgroup K that solves the Yang--Mills equation for (EG ,θ). We prove that the principal G-bundle EG is polystable and the above reduction EK solves the Einstein--Hermitian equation for EG. We also prove that for a semistable (respectively, polystable) Higgs G-bundle (EG , θ) on a compact connected Calabi--Yau manifold, the underlying principal G-bundle EG is semistable (respectively, polystable).