Goldman form, flat connections and stable vector bundles

Abstract

We consider the moduli space N of stable vector bundles of degree 0 over a compact Riemann surface and the affine bundle AN of flat connections. Following the similarity between the Teichm\"uller spaces and the moduli of bundles, we introduce the analogue of of the quasi-Fuchsian projective connections - local holomorphic sections of A - that allow to pull back the Liouville symplectic form on T*N to A. We prove that the pullback of the Goldman form to A by the Riemann-Hilbert correspondence coincides with the pullback of the Liouville form. We also include a simple proof, in the spirit of Riemann bilinear relations, of the classic result - the pullback of Goldman symplectic form to N by the Narasimhan-Seshadri connection is the natural symplectic form on N, introduced by Narasimhan and Atiyah & Bott.