On the image of Hitchin morphism for algebraic surfaces: The case GLn

Abstract

The Hitchin morphism is a map from the moduli space of Higgs bundles MX to the Hitchin base BX, where X is a smooth projective variety. When X has dimension at least two, this morphism is not surjective in general. Recently, Chen-Ng\o introduced a closed subscheme AX of BX, which is called the space of spectral data. They proved that the Hitchin morphism factors through AX and conjectured that AX is the image of the Hitchin morphism. We prove that when X is a smooth projective surface, this conjecture is true for vector bundles. Moreover, we show that AX, for any dimension, is invariant under proper birational morphisms, and apply the result to study AX for ruled surfaces.