Meromorphic Hodge moduli spaces for reductive groups in arbitrary characteristic

Abstract

Fix a smooth projective family of curves C S and a split reductive group scheme G over a Noetherian base scheme S. For any (possibly nonreduced) fixed relative Cartier divisor D, we provide a treatment of the moduli of G-bundles on the fibers of C equipped with t-connections with pole orders bounded by D. Under mild assumptions on the characteristics of all the residue fields of S, we construct a Hodge moduli space MHod, G A1S for the semistable locus, construct a Harder-Narasimhan stratification, and thus obtain a semistable reduction theorem. If all the fibers of the divisor of poles D are nonempty, then we show that the stack of semistable objects is smooth over A1S. We also define a Hodge-Hitchin morphism in positive characteristic and prove that it is proper.