English

Lie groupoids and logarithmic connections

Differential Geometry 2020-10-09 v1 Algebraic Geometry Classical Analysis and ODEs

Abstract

Using tools from the theory of Lie groupoids, we study the category of logarithmic flat connections on principal GG-bundles, where GG is a complex reductive structure group. Flat connections on the affine line with a logarithmic singularity at the origin are equivalent to representations of a groupoid associated to the exponentiated action of C\mathbb{C}. We show that such representations admit a canonical Jordan-Chevalley decomposition and use this to give a functorial classification. Flat connections on a complex manifold with logarithmic singularities along a hypersurface are equivalent to representations of a twisted fundamental groupoid. Using a Morita equivalence, whose construction is inspired by Deligne's notion of paths with tangential basepoints, we prove a van Kampen type theorem for this groupoid. This allows us to show that the category of representations of the twisted fundamental groupoid can be localized to the normal bundle of the hypersurface. As a result, we obtain a functorial Riemann-Hilbert correspondence for logarithmic connections in terms of generalized monodromy data.

Keywords

Cite

@article{arxiv.2010.03685,
  title  = {Lie groupoids and logarithmic connections},
  author = {Francis Bischoff},
  journal= {arXiv preprint arXiv:2010.03685},
  year   = {2020}
}

Comments

26 pages

R2 v1 2026-06-23T19:09:02.359Z