Let $G$ be a linear complex Lie group which is not solvable and not semisimple. let $N$ be the nilpotent radical of $G$. Does there exist a unipotent normal subgroup $U$ of $G$ which contains the last non-trivial term of the lower central series of $N$?
2026-03-25 07:43:20.1774424600
Unipotent normal subgruops of linear Lie groups
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