Lefschetz principle-type theorems for curves semistable Higgs sheaves and applications

Abstract: I study Higgs bundles over smooth projective varieties defined on an algebraically closed field of characteristic $0$. I prove ``Lefschetz principle''-type theorems for semistable Higgs sheaves and curve semistable Higgs bundles. I give an application to variates whose canonical bundle is ample, showing stability of the so-called Simpson System. From all this I obtain another proof of the Guggenheimer-Yau inequality. Where this inequality is saturated, I prove that the discriminant class of the Simpson system vanishes. This follows from the study of the relations between these numerical properties of Higgs bundles and curve semistability.