A stacky nilpotent $p$-adic Riemann-Hilbert correspondence

Let $\overline X$ be a smooth rigid variety over $C=\mathbb C_p$ admitting a lift $X$ over $B_{dR}^+$. In this paper, we use the stacky language to prove a nilpotent $p$-adic Riemann-Hilbert correspondence. After introducing the moduli stack of $\mathbb B^+_{dR}$-local systems and $t$-connections, we prove that there is an equivalence of the nilpotent locus of the two stacks: $RH^0:LS^0_X \to tMIC^0_X$, where $LS^0_X$ is the stack of nilpotent $\mathbb B^+_{dR}$-local systems on $\overline X_{1,v}$ and $tMIC^0_X$ is the stack of $\mathcal{O}_X$-bundles with integrable $t$-connection on $X_{et}$.
Comment: 15 pages, all comments welcome!