Transitive irreducible Lie superalgebras of vector fields
Abstract
Let d be the Lie superalgebra of superderivations of the sheaf of sections of the exterior algebra of the homogeneous vector bundle E over the flag variety G/P, where G is a simple finite-dimensional complex Lie group and P its parabolic subgroup. Then, d is transitive and irreducible whenever E is defined by an irreducible P-module V such that the highest weight of V* is dominant. Moreover, d is simple; it is isomorphic to the Lie superalgebra of vector fields on the superpoint, i.e., on a 0|n-dimensional supervariety.
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