Comptage des syst\`emes locaux -adiques sur une courbe

Abstract

Let X1 be a projective, smooth and geometrically connected curve over Fq with q=pn elements where p is a prime number, and let X be its base change to an algebraic closure of Fq. We give a formula for the number of irreducible -adic local systems (≠ p) with a fixed rank over X fixed by the Frobenius endomorphism. We prove that this number behaves like a Lefschetz fixed point formula for a variety over Fq, which generalises a result of Drinfeld in rank 2 and proves a conjecture of Deligne. To do this, we pass to the automorphic side by Langlands correspondence, then use Arthur's non-invariant trace formula and link this number to the number of Fq-points of the moduli space of stable Higgs bundles.