Given a parabolic subgroup $P=MN$ of a connected reductive group $G$ defined over a local field $F$, let $W_M$ be the relative Weyl group of $M$ in $G$, assume that the reduced roots relative to $M$ in $G$ form a root system of rank two, i.e. $$W_M=\left< S_\alpha, S_\beta \right>,$$ where $\alpha$ and $\beta$ are the simple roots of M in G, and $S_\alpha$ and $S_\beta$ are the corresponding simple reflections which satisfy $$S_\alpha.M=M \mbox{ and } S_\beta.M=M.$$ For simple root $\alpha$ (resp. $\beta$), we denote by $M_\alpha$ (resp. $M_\beta$) the Levi subgroup of its associated maximal parabolic subgroup. Denote by $M'_\alpha$ the derived group of $M_\alpha$, similarly $M'_\beta$. The question about high-level Jacob Morozov SL_2 triple is as follows: at least one of $M'_\alpha$ and $M'_\beta$ is isogenous to $SL(n,D)$? where $D$ is a division algebra over $F$. If $G$ is quasi-split and $P$ is a minimal parabolic subgroup, then it is isogenous to $Res_{E/F}SL_2$ or $SU(2,1)_{F(\sqrt{d})/F}$. Thank you so much for your help.