## About: Nilradical of a Lie algebraGotoSponge NotDistinct Permalink

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In algebra, the nilradical of a Lie algebra is a nilpotent ideal, which is as large as possible. The nilradical of a finite-dimensional Lie algebra is its maximal nilpotent ideal, which exists because the sum of any two nilpotent ideals is nilpotent. It is an ideal in the radical of the Lie algebra . The quotient of a Lie algebra by its nilradical is a reductive Lie algebra . However, the corresponding short exact sequence does not split in general (i.e., there isn't always a subalgebra complementary to in ). This is in contrast to the Levi decomposition: the short exact sequence

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• In algebra, the nilradical of a Lie algebra is a nilpotent ideal, which is as large as possible. The nilradical of a finite-dimensional Lie algebra is its maximal nilpotent ideal, which exists because the sum of any two nilpotent ideals is nilpotent. It is an ideal in the radical of the Lie algebra . The quotient of a Lie algebra by its nilradical is a reductive Lie algebra . However, the corresponding short exact sequence does not split in general (i.e., there isn't always a subalgebra complementary to in ). This is in contrast to the Levi decomposition: the short exact sequence
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• Nilradical of a Lie algebra
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• In algebra, the nilradical of a Lie algebra is a nilpotent ideal, which is as large as possible. The nilradical of a finite-dimensional Lie algebra is its maximal nilpotent ideal, which exists because the sum of any two nilpotent ideals is nilpotent. It is an ideal in the radical of the Lie algebra . The quotient of a Lie algebra by its nilradical is a reductive Lie algebra . However, the corresponding short exact sequence does not split in general (i.e., there isn't always a subalgebra complementary to in ). This is in contrast to the Levi decomposition: the short exact sequence does split (essentially because the quotient is semisimple).
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