Stratifying moduli spaces of Higgs bundles and the Hitchin morphism

Abstract

We study the behavior of slope-stability of reflexive twisted sheaves over a normal projective variety X under pullback along a cover. Slope-stability is always preserved if the cover does not factor via a quasi-\'etale cover. Fixing the rank, there is one quasi-\'etale cover that checks whether a twisted sheaf remains slope-stable on all Galois covers, yielding a stratification of the moduli space of slope-stable Higgs-bundles. As an application, we determine the image of the Hitchin morphism restricted to the smallest closed stratum of the Dolbeault moduli space when X is smooth. This allows us to determine the image of the Hitchin morphism from the Dolbeault moduli space when X is a hyperelliptic or abelian variety in characteristic p0. In particular, we show that Chen-Ng\o's conjecture holds for hyperelliptic varieties in characteristic 0.