Geometric local systems on very general curves and isomonodromy
Abstract
We show that the minimum rank of a non-isotrivial local system of geometric origin, on a suitably general n-pointed curve of genus g, is at least 2g+1. We apply this result to resolve conjectures of Esnault-Kerz and Budur-Wang. The main input is an analysis of stability properties of flat vector bundles under isomonodromic deformation, which additionally answers questions of Biswas, Heu, and Hurtubise.
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