On the Moduli space of λ-connections

Abstract

Let X be a compact Riemann surface of genus g ≥ 3. Let MHod denote the moduli space of stable λ-connections over X and M'Hod ⊂ MHod denote the subvariety whose underlying vector bundle is stable. Fix a line bundle L of degree zero. Let MHod(L) denote the moduli space of stable λ-connections with fixed determinant L and M'Hod(L) ⊂ MHod(L) be the subvariety whose underlying vector bundle is stable. We show that there is a natural compactification of M'Hod and M'Hod (L), and study their Picard groups. Let Hod(L) denote the moduli space of polystable λ-connections. We investigate the nature of algebraic functions on MHod(L) and Hod(L). We also study the automorphism group of M'Hod(L).