On the stability of flat complex vector bundles over parallelizable manifolds

Abstract

We investigate the flat holomorphic vector bundles over compact complex parallelizable manifolds G / , where G is a complex connected Lie group and is a cocompact lattice in it. The main result proved here is a structure theorem for flat holomorphic vector bundles E associated to any irreducible representation : → GL(r, C). More precisely, we prove that E is holomorphically isomorphic to a vector bundle of the form E n, where E is a stable vector bundle. All the rational Chern classes of E vanish, in particular, its degree is zero. We deduce a stability result for flat holomorphic vector bundles E of rank 2 over G/ . If an irreducible representation : → GL(2, C) satisfies the conditionmthat the induced homomorphism → PGL(2, C) does not extend to a homomorphism from G, then E is proved to be stable.