Integral $p$-adic non-abelian Hodge theory for small representations

Abstract: Let $\frakX$ be a smooth $p$-adic formal scheme over $\calO_C$ with rigid generic fiber $X$. In this paper, we construct a new period sheaf $\calO\widehat \bC_{\pd}^+$ on $X_{\proet}$ and use it to establish an integral $p$-adic Simspon correspondence for small $\OXp$-representations on $X_{\proet}$ and small Higgs bundles on $\frakX_{\et}$ which is compatible with the works on rational level. In particular, for a small $\OXp$-representations $\calL$ with induced Higgs bundle $(\calH,\theta_{\calH})$, we provide a canonical morphism $\HIG(\calH,\theta_{\calH})\to\rR\nu_*\calL$ with a uniformly bounded $p^{\infty}$-torsion cofiber. Finally, we shall use this canonical map to study an analogue of Deligne--Illusie decomposition with coefficients in small $\OXp$-representations.