Differential Galois groups of G-connections with Coxeter singularities

Abstract

A fundamental theorem of Katz Katz87 determines the differential Galois groups of rank n connections on algebraic curves with slope r/n at a singularity, where (r,n)=1. We extend this result to G-connections, where G is a simple algebraic group and the slope is r/h, with h the Coxeter number of G and (r,h)=1. This allows us to compute the differential Galois groups of a broad class of G-connections that have been central to recent advances in the geometric Langlands program and the Deligne--Simpson problem -- namely, Coxeter connections, generalised Frenkel--Gross connections, and Airy connections. We apply our results to inverse differential Galois theory by giving uniform and explicit constructions of G-connections whose differential Galois groups realise all reductive subgroups of maximal degree.