Semistable Higgs bundles and representations of algebraic fundamental groups: Positive characteristic case

Abstract

Let k be an algebraic closure of finite fields with odd characteristic p and a smooth projective scheme X/W(k). Let X0 be its generic fiber and X the closed fiber. For X0 a curve Faltings conjectured that semistable Higgs bundles of slope zero over X0Cp correspond to genuine representations of the algebraic fundamental group of X0Cp in his p-adic Simpson correspondence. This paper intends to study the conjecture in the characteristic p setting. Among other results, we show that isomorphism classes of rank two semistable Higgs bundles with trivial chern classes over X are associated to isomorphism classes of two dimensional genuine representations of X0 and the image of the association contains all irreducible crystalline representations. We introduce intermediate notions strongly semistable Higgs bundles and quasi-periodic Higgs bundles between semistable Higgs bundles and representations of algebraic fundamental groups. We show that quasi-periodic Higgs bundles give rise to genuine representations and strongly Higgs semistable are equivalent to quasi-periodic. We conjecture that a Higgs semistable bundle is indeed strongly Higgs semistable.