Polynomial deformations of osp(1/2) and generalized parabosons

Abstract

We consider the algebra R generated by three elements A,B,H subject to three relations [H,A]=A, [H,B]=-B and \A,B\=f(H). When f(H)=H this coincides with the Lie superalgebra osp(1/2); when f is a polynomial we speak of polynomial deformations of osp(1/2). Irreducible representations of R are described, and in the case (f)≤ 2 we obtain a complete classification, showing some similarities but also some interesting differences with the usual osp(1/2) representations. The relation with deformed oscillator algebras is discussed, leading to the interpretation of R as a generalized paraboson algebra.

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