Let $X$ be a compact Riemann surface of genus $g \geq 3$. We consider the moduli space of holomorphic connections over $X$ and the moduli space of logarithmic connections singular over a finite subset of $X$ with fixed residues. We determine the Chow group of these moduli spaces. We compute the global sections of the sheaves of differential operators on ample line bundles and their symmetric powers over these moduli spaces, and show that they are constant under certain condition. We show the Torelli type theorem for the moduli space of logarithmic connections. We also describe the rational connectedness of these moduli spaces.
Torelli theorem for moduli spaces of SL(r,C)-connections on a compact Riemann surface
Hodge structure on the cohomology of the moduli space of Higgs bundles
Moduli of parahoric $\mathcal G$--torsors on a compact Riemann surface
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