The Tits construction for short sl2-super-structures
Abstract
In this paper, we generalize the Tits construction for Lie superalgebras such that sl2 acts by even derivations and decompose, as sl2-module, into a direct sum of copies of the adjoint, the natural and the trivial representations. This construction generalizes the one provided by Elduque et al in EBCC23, and it is possible to described the sl2-Lie superstructure in terms of J-ternary superalgebras as a super version of the defined by Allison. We extend the Tits-Kantor-Koecher construction and the Tits-Allison-Gao functor that define a short sl2-Lie superalgebra from a J-ternary superalgebra (J,M). Our setting includes and generalizes both EBCC23 and Shang's S22.
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