On Degenerations of Lie Superalgebras
Abstract
We give necessary conditions for the existence of degenerations between two complex Lie superalgebras of dimension (m,n). As an application, we study the variety LS(2,2) of complex Lie superalgebras of dimension (2,2). First we give the algebraic classification and then obtain that LS(2,2) is the union of seven irreducible components, three of which are the Zariski closures of rigid Lie superalgebras. As byproduct, we obtain an example of a nilpotent rigid Lie superalgebra, in contrast to the classical case where no example is known.
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