Nilradical of a Lie algebra

Template:No footnotes In algebra, the nilradical of a Lie algebra is a nilpotent ideal, which is as large as possible.

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

${\displaystyle 0\to 𝔫𝔦𝔩(𝔤)\to 𝔤\to {𝔤}^{\mathrm{r}\mathrm{e}\mathrm{d}}\to 0}$

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

${\displaystyle 0\to 𝔯𝔞𝔡(𝔤)\to 𝔤\to {𝔤}^{\mathrm{s}\mathrm{s}}\to 0}$

does split (essentially because the quotient ${\displaystyle {𝔤}^{\mathrm{s}\mathrm{s}}}$ is semisimple).

• Levi decomposition
• Nilradical of a ring, a notion in ring theory.

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