Cohomology of perfect Lie algebras
Abstract
We study the adjoint cohomology of perfect Lie algebras over the complex numbers. For the family of perfect Lie algebras g=sl2( C) Vm we obtain some explicit results for Hk(g,g) with k 0. Here Vm is the irreducible representation of sl2( C) of dimension m+1. For the computation of the cohomology we use the Hochschild-Serre formula, a long exact sequence in the cohomology and explicit formulas for the multiplicities of Vk in the exterior product j(Vm) for j 4. In general we cannot determine the total adjoint cohomology for sl2( C) Vm, but for some small m this is possible. We also give a classification of complex perfect Lie algebras g of dimension n 9 and explicitly compute the cohomology spaces Hk(g,g) with k=0,1,2 for all Lie algebras from the classification list.
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