Representations of Atiyah algebroids and logarithmic connections

Abstract

In this paper, we investigate representations of At(N), the Atiyah algebroids of a holomorphic line bundles N over a complex manifold Y. In particular, we relate At(N)-modules with logarithmic connections through two functors. On the one hand, we use these functors to the define invariants (monodromy) for representations of Atiyah algebroids. On the other hand, this opens the way to use the theory of Lie algebroids to study problems about logarithmic connections; we will give an example of this by showing that the existence of Deligne's extensions of flat connections and the Riemann-Hilbert correspondence for regular flat meromorphic connections may be obtained as pull-back of similar results for At(N)-modules, and, at this level, these results are a direct consequence of the second theorem of Lie.