Let's start with subalgebra $A \subset GL(N, R)$ with commutator as Lie bracket. It has subset of invertable elements which form group $G$.
I want to proof (if it's true of course)
- $G$ is Lie group
- Lie algebra of $G$ is $A$
2026-04-07 19:31:29.1775590289
Multiplative subgroup of lie algebra
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