Integrable module

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In algebra, an integrable module (or integrable representation) of a Kac–Moody algebra 𝔤 (a certain infinite-dimensional Lie algebra) is a representation of 𝔤 such that (1) it is a sum of weight spaces and (2) the Chevalley generators ei,fi of 𝔤 are locally nilpotent.[1] For example, the adjoint representation of a Kac–Moody algebra is integrable.[2]

Notes

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  1. ^ Kac 1990, § 3.6.
  2. ^ Kac 1990, Lemma 3.5.

References

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