-adic local systems and Higgs bundles: the generic case

Abstract

Let X be a projective smooth geometrically connected curve defined over a finite field Fq of cardinality q. Let S be a finite set of closed points of X. Let X and S be the base change of X, S to an algebraic closure. We consider the set of -adic ( q) local systems of rank n over X-S with prescribed tame regular semisimple and generic ramifications in S. The genericity ensures that such an -adic local system is automatically irreducible. We show that the number of these -adic local systems fixed by Frobenius endomorphism equals the number of stable logarithmic Higgs bundles of rank n and degree e coprime to n, with a fixed residue, up to a power of q. In the split case, this number is equal to the number of stable parabolic Higgs bundles (with full flag structures) fixed by Gm-action with generic parabolic weights.