English

On the monodromy map for the logarithmic differential systems

Algebraic Geometry 2024-03-21 v1 Complex Variables

Abstract

We study the monodromy map for logarithmic g\mathfrak g-differential systems over an oriented surface S0S_0 of genus gg, with g\mathfrak g being the Lie algebra of a complex reductive affine algebraic group GG. These logarithmic g\mathfrak g-differential systems are triples of the form (X,D,Φ)(X, D,\Phi), where (X,D)Tg,d(X, D) \in {\mathcal T}_{g,d} is an element of the Teichm\"uller space of complex structures on S0S_0 with d1d \geq 1 ordered marked points DS0=XD\subset S_0= X and Φ\Phi is a logarithmic connection on the trivial holomorphic principal GG-bundle X×GX \times G over XX whose polar part is contained in the divisor DD. We prove that the monodromy map from the space of logarithmic g\mathfrak g-differential systems to the character variety of GG-representations of the fundamental group of S0DS_0\setminus D is an immersion at the generic point, in the following two cases: A) g2g \geq 2, d1d \geq 1, and dimCGd+2\dim_{\mathbb C}G \geq d+2; B) g=1g=1 and dimCGd\dim_{\mathbb C}G \geq d. The above monodromy map is nowhere an immersion in the following two cases: 1) g=0g=0 and d4d \geq 4; 2) g1g\geq 1 and dimCG<d+3g3g\dim_{\mathbb C}G < \frac{d+3g-3}{g}. This extends to the logarithmic case the main results in \cite{CDHL}, \cite{BD} dealing with nonsingular holomorphic g\mathfrak g-differential systems (which corresponds to the case of d=0d\,=\,0).

Keywords

Cite

@article{arxiv.2201.04095,
  title  = {On the monodromy map for the logarithmic differential systems},
  author = {Marian Aprodu and Indranil Biswas and Sorin Dumitrescu and Sebastian Heller},
  journal= {arXiv preprint arXiv:2201.04095},
  year   = {2024}
}
R2 v1 2026-06-24T08:46:47.274Z