On the monodromy map for the logarithmic differential systems

Abstract

We study the monodromy map for logarithmic g-differential systems over an oriented surface S0 of genus g, with g being the Lie algebra of a complex reductive affine algebraic group G. These logarithmic g-differential systems are triples of the form (X, D,), where (X, D) ∈ Tg,d is an element of the Teichm\"uller space of complex structures on S0 with d ≥ 1 ordered marked points D⊂ S0= X and is a logarithmic connection on the trivial holomorphic principal G-bundle X × G over X whose polar part is contained in the divisor D. We prove that the monodromy map from the space of logarithmic g-differential systems to the character variety of G-representations of the fundamental group of S0 D is an immersion at the generic point, in the following two cases: A) g ≥ 2, d ≥ 1, and CG ≥ d+2; B) g=1 and CG ≥ d. The above monodromy map is nowhere an immersion in the following two cases: 1) g=0 and d ≥ 4; 2) g≥ 1 and CG < d+3g-3g. This extends to the logarithmic case the main results in CDHL, BD dealing with nonsingular holomorphic g-differential systems (which corresponds to the case of d\,=\,0).