On Abel-Jacobi maps of moduli of parabolic bundles over a curve

Abstract

Let C be a nonsingular complex projective curve, and L e a line bundle of degree 1 on C. Let Mα := M(r,L,α) denote the moduli space of S-equivalence classes of Parabolic stable bundles of fixed rank r, determinant L, full flags and generic weight α. Let n= dimMα. We aim to study the Abel-Jacobi maps for Mα in the cases k=2,n-1. When k=n-1, we prove that the Abel-Jacobi map is a split surjection. When k=2 and r=2, we show that the Abel-Jacobi map is an isomorphism.