On semistable principal bundles over a complex projective manifold, II

Abstract

Let (X, ω) be a compact connected Kaehler manifold of complex dimension d and EG a holomorphic principal G-bundle on X, where G is a connected reductive linear algebraic group defined over C. Let Z (G) denote the center of G. We prove that the following three statements are equivalent: (1) There is a parabolic subgroup P of G and a holomorphic reduction of the structure group of EG to P (say, EP) such that the bundle obtained by extending the structure group of EP to L(P)/Z(G) (where L(P) is the Levi quotient of P) admits a flat connection; (2) The adjoint vector bundle ad(EG) is numerically flat; (3) The principal G-bundle EG is pseudostable, and the degree of the charateristic class c2(ad(EG) is zero.