Moduli of pre- D-modules, perverse sheaves and the Riemann-Hilbert morphism -I
Abstract
We construct a moduli scheme for semistable pre--modules with prescribed singularities and numerical data on a smooth projective variety. These pre--modules are to be viewed as regular holonomic -modules with `level structure'. We also construct a moduli scheme for perverse sheaves on the variety with prescribed singularities and other numerical data, and represent the de Rham functor (which gives the Riemann-Hilbert correspondence) by an analytic morphism between the two moduli schemes.
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