On logarithmic nonabelian Hodge theory of higher level in characteristic p

Abstract: Given a natural number $m$ and a log smooth integral morphism $X\to S$ of fine log schemes of characteristic $p>0$ with a lifting of its Frobenius pull-back $X'\to S$ modulo $p^{2}$, we use indexed algebras ${\cal A}{X}^{gp}$, ${\cal B}{X/S}^{(m+1)}$ of Lorenzon-Montagnon and the sheaf ${\cal D}{X/S}^{(m)}$ of log differential operators of level $m$ of Berthelot-Montagnon to construct an equivalence between the category of certain indexed ${\cal A}{X}^{gp}$-modules with ${\cal D}{X/S}^{(m)}$-action and the category of certain indexed ${\cal B}{X/S}^{(m+1)}$-modules with Higgs field. Our result is regarded as a level $m$ version of some results of Ogus-Vologodsky and Schepler.