Generalization of Weyl realization to a class of Lie superalgebras
Abstract
This paper generalizes Weyl realization to a class of Lie superalgebras g=g0 g1 satisfying [g1,g1]=\0\. First, we give a novel proof of the Weyl realization of a Lie algebra g0 by deriving a functional equation for the function that defines the realization. We show that this equation has a unique solution given by the generating function for the Bernoulli numbers. This method is then generalized to Lie superalgebras of the above type.
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