Isomonodromic deformations of irregular connections and stability of bundles

Abstract

Let G be a reductive affine algebraic group defined over C, and let ∇0 be a meromorphic G-connection on a holomorphic G-bundle E0, over a smooth complex curve X0, with polar locus P0 ⊂ X0. We assume that ∇0 is irreducible in the sense that it does not factor through some proper parabolic subgroup of G. We consider the universal isomonodromic deformation (Et Xt, ∇t, Pt)t∈ T of (E0 X0, ∇0, P0), where T is a certain quotient of a certain framed Teichm\"uller space we describe. We show that if the genus g of X0 satisfies g≥ 2, then for a general parameter t∈ T, the G-bundle Et Xt is stable. For g≥ 1, we are able to show that for a general parameter t∈ T, the G-bundle Et Xt is semistable.