Table of Contents
Fetching ...

On the monodromy map for the logarithmic differential systems

Marian Aprodu, Indranil Biswas, Sorin Dumitrescu, Sebastian Heller

Abstract

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

On the monodromy map for the logarithmic differential systems

Abstract

We study the monodromy map for logarithmic -differential systems over an oriented surface of genus , with being the Lie algebra of a complex reductive affine algebraic group . These logarithmic -differential systems are triples of the form , where is an element of the Teichmüller space of complex structures on with ordered marked points and is a logarithmic connection on the trivial holomorphic principal -bundle over whose polar part is contained in the divisor . We prove that the monodromy map from the space of logarithmic -differential systems to the character variety of -representations of the fundamental group of is an immersion at the generic point, in the following two cases: A) , , and ; B) and . The above monodromy map is nowhere an immersion in the following two cases: 1) and ; 2) and . This extends to the logarithmic case the main results in \cite{CDHL}, \cite{BD} dealing with nonsingular holomorphic -differential systems (which corresponds to the case of ).
Paper Structure (10 sections, 10 theorems, 126 equations)

This paper contains 10 sections, 10 theorems, 126 equations.

Key Result

Theorem 1.1

Assume that $3g-3+d\, >\, 0$ and $d\, \geq\, 1$. The Riemann-Hilbert monodromy mapping from the above space of irreducible logarithmic $\mathfrak g$--differential systems to the character variety of irreducible $G$-representations of the fundamental group of $S_0\setminus D$ is an immersion at the g The Riemann-Hilbert monodromy mapping from the above space of irreducible logarithmic $\mathfrak g$

Theorems & Definitions (21)

  • Theorem 1.1
  • Lemma 2.1
  • Lemma 3.1
  • proof
  • Proposition 3.2
  • Proposition 4.1
  • proof
  • Remark 4.2
  • Lemma 4.3
  • proof
  • ...and 11 more