Numerical flatness and principal bundles on Fujiki manifolds

Abstract

Let M be a compact connected Fujiki manifold, G a semisimple affine algebraic group over C with one simple factor and P a fixed proper parabolic subgroup of G. For a holomorphic principal G--bundle EG over M, let EP be the holomorphic principal P-bundle EG→ EG/P given by the quotient map. We prove that the following three statements are equivalent: (1) ad(EG) is numerically flat, (2) the holomorphic line bundle top ad( EP)* is nef, and (3) for every reduced irreducible compact complex analytic space Z with a K\"ahler form ω, holomorphic map γ : Z → M, and holomorphic reduction of structure group EP ⊂ γ*EG to P, the inequality degree( ad(EP)) ≤ 0 holds.