Rank 2 -adic local systems and Higgs bundles over a curve

Abstract

Let X be a smooth, projective, and geometrically connected curve defined over a finite field Fq of characteristic p different from 2 and S⊂eq X a subset of closed points. Let X and S be their base changes to an algebraic closure of Fq. We study the number of -adic local systems (≠ p) in rank 2 over X-S with all possible prescribed tame local monodromies fixed by k-fold iterated action of Frobenius endomorphism for every k≥ 1. In all cases, we confirm conjectures of Deligne predicting that these numbers behave as if they were obtained from a Lefschetz fixed point formula. In fact, our counting results are expressed in terms of the numbers of some Higgs bundles.