Comptage de fibr\'es de Hitchin pour le groupe SL(n)

Abstract

Let C be a smooth projective curve of genus g over a finite field Fq and let D be a divisor on C of degree >2g-2. We assume that the characteristic of Fq is sufficiently large. Let n be an integer and let β be a line bundle on C of degree e, coprime to n. We give a formula for the number of stable (D-twisted) Hitchin bundles over C of rank n and determinant β in terms of the number of stable Hitchin bundles over C' of rank n/d and degree e where C' ranges over cyclic covers C' of C of degree d dividing n. Using a work by Mozgovoy-O'Gorman, we derive a closed formula for the following invariants of the moduli space of (D-twisted) Hitchin bundles over C of rank n, trace 0 and determinant β: its number of points over finite extensions of Fq, its -adic Poincar\'e polynomial and its Euler-Poincar\'e characteristic. Our main tools are the fundamental lemma of automorphic induction and a support theorem for the relative cohomology of a local system on the Hitchin fibration for the group GL(n).