The Grothendieck-Katz Conjecture for privileged local systems

Abstract

We define study privileged local systems on a smooth quasi-projective complex variety X with fixed quasi-unipotent monodromies around a boundary divisor. The notion is a generalization of Katz' physical rigidity on an open of P1. It is defined in any dimension and includes non-rigid local systems. In the latter case, Katz used the middle convolution procedure to classify all physically local systems and derived several consequences such as the p-curvature conjecture for local systems of this type. We present a new proof, which avoids the use of middle convolution. This yields examples in higher dimension of local systems which verify the p-curvature conjecture.