Gieseker conjecture for homogeneous spaces
Abstract
We prove Gieseker conjecture for an homogeneous space X, saying that if X has no non-trivial tame coverings then it has no non-trivial regular singular OX-coherent DX/k-modules. In order to do so we prove a K\"unneth formula for the regular singular stratified fundamental group and a base change for Gauss-Manin stratifications in the non-proper case.
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