Odd nilpotent element and osp(1|2)-subalgebra in gl(m|n)
Abstract
In this paper, we investigate the conditions under which an odd nilpotent element in gl(m|n) lies inside an osp(1|2)-subalgebra. In the case of the classical Lie algebra glm, every nilpotent element can be embedded into an sl2-subalgebra, which is the result of the Jacobson-Morozov Theorem. In the case of the Lie superalgebra gl(m|n), we define super Jordan matrices and prove that an odd nilpotent element e is contained in an osp(1|2)-subalgebra if and only if e lies in the orbit of a super Jordan matrix consisting only of super Jordan blocks of odd size.
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