Let $G$ a semisimple group over $k=\bar{k}$.
Let the $k$-indgroup, $LG^{-}\subset G(k[t^{-1}])$ be the kernel of the reduction. We know by Faltings that the multiplication map:
$LG^{-}\times G(k[[t]])\rightarrow G(k((t)))$ is an open immersion.
Is it still true, if we replace $LG^{-}$ by $LG^{-n}\subset G(k[t^{-1}])$, which is the kernel of the réduction mod $t^{-n}$?
