Nilradical of a Lie algebra

{{No footnotes|date=December 2023}}

In algebra, the nilradical of a Lie algebra is a nilpotent ideal, which is as large as possible.

The nilradical $\backslash mathfrak\{nil\}(\backslash mathfrak\; g)$ of a finite-dimensional Lie algebra $\backslash mathfrak\{g\}$ is its maximal nilpotent ideal, which exists because the sum of any two nilpotent ideals is nilpotent. It is an ideal in the radical $\backslash mathfrak\{rad\}(\backslash mathfrak\{g\})$ of the Lie algebra $\backslash mathfrak\{g\}$. The quotient of a Lie algebra by its nilradical is a reductive Lie algebra $\backslash mathfrak\{g\}^\{\backslash mathrm\{red\}\}$. However, the corresponding short exact sequence

:$0\; \backslash to\; \backslash mathfrak\{nil\}(\backslash mathfrak\; g)\backslash to\; \backslash mathfrak\; g\backslash to\; \backslash mathfrak\{g\}^\{\backslash mathrm\{red\}\}\backslash to\; 0$

does not split in general (i.e., there isn't always a subalgebra complementary to $\backslash mathfrak\{nil\}(\backslash mathfrak\; g)$ in $\backslash mathfrak\{g\}$). This is in contrast to the Levi decomposition: the short exact sequence

:$0\; \backslash to\; \backslash mathfrak\{rad\}(\backslash mathfrak\; g)\backslash to\; \backslash mathfrak\; g\backslash to\; \backslash mathfrak\{g\}^\{\backslash mathrm\{ss\}\}\backslash to\; 0$

does split (essentially because the quotient $\backslash mathfrak\{g\}^\{\backslash mathrm\{ss\}\}$ is semisimple).