Is there a sub Lie algebra $K$ such that for an ideal $M$ of a heisenberg algebra $H$, $H=K+M$ and $K\cap M=0$ ($M$ has a complement in $H$)?
Is there a class of Lie algebras such every ideal $M$ has a complement?
Yours,
2026-05-05 13:41:08.1777988468
Heisenberg algebra and other Lie algberas
97 Views Asked by Bumbble Comm https://math.techqa.club/user/bumbble-comm/detail AtRelated Questions in LIE-ALGEBRAS
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