On semi-finite vector bundles with connection over Kahler manifolds

Abstract

Let X be a compact connected K\"ahler manifold. We consider the category CEC(X) of flat holomorphic connections (E,\, ∇E) over X satisfying the condition that the underlying holomorphic vector bundle E admits a filtration of holomorphic subbundles preserved by the connection ∇E such that the monodromy of the induced connection on each successive quotient has finite image. The category CEC(X), equipped with the neutral fiber functor that sends any object (E,\, ∇E) to the fiber Ex0, where x0\, ∈\, X is a fixed point, defines a neutral Tannakian category over C. Let EC(X,\, x0) denote the affine group scheme corresponding to this neutral Tannakian category CEC(X). Let πEN(X,\, x0) be an extension of the Nori fundamental group scheme over C. We show that πEN(X,\, x0) is a closed subgroup scheme of EC(X,\, x0). Finally, we discuss an example illustrating that if X is not K\"ahler, then the natural homomorphism πEN(X,\, x0)\, \, EC(X,\, x0) might fail to be an embedding.