A Lie algebra L is said to be reductive if Z(L) = Rad(L). (For parts (b), (c), assume chark = 0 andk algebraically closed.) (a) Prove that a reductive Lie algebra is a direct sum of an abelian Lie algebra and a semisimple Lie algebra. (b) Assume that L has a faithful irreducible finite dimensional representation. Prove that L is reductive. (c) Assume that L has a faithful completely reducible finite dimensional represen- tation. Prove that L is reductive.

Advanced Engineering Mathematics
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A Lie algebra L is said to be reductive if Z(L) = Rad(L). (For parts (b), (c), assume
chark = 0 and k algebraically closed.)
(a) Prove that a reductive Lie algebra is a direct sum of an abelian Lie algebra and
a semisimple Lie algebra.
(b) Assume that L has a faithful irreducible finite dimensional representation. Prove
that L is reductive.
(c) Assume that L has a faithful completely reducible finite dimensional represen-
tation. Prove that L is reductive.
Transcribed Image Text:A Lie algebra L is said to be reductive if Z(L) = Rad(L). (For parts (b), (c), assume chark = 0 and k algebraically closed.) (a) Prove that a reductive Lie algebra is a direct sum of an abelian Lie algebra and a semisimple Lie algebra. (b) Assume that L has a faithful irreducible finite dimensional representation. Prove that L is reductive. (c) Assume that L has a faithful completely reducible finite dimensional represen- tation. Prove that L is reductive.
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