Computing parabolically induced embeddings of semisimple complex Lie algebras in Weyl algebras
Abstract
An arbitrary proper parabolic subalgebra p of a simple complex Lie algebra g induces an embedding g Wn, and more generally an embedding g Wn End V, where Wn is the Weyl algebra in n variables, n is the dimension of the nilradical of p, and V is an arbitrary p-module. We give an elementary proof of this known fact, report on a computer program computing the embeddings, and tabulate exceptional Lie algebra embeddings G2 W5, F4 W15, E6 W16, E7 W27, E8 W57 arising in this fashion.
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