Irreducible Components of the Varieties of Jordan Superalgebras of Types (1,3) and (3,1)
Abstract
We describe the variety of Jordan superalgebras of dimension 4 whose even part is a Jordan algebra of dimension 1 or 3. We prove that the variety is the union of Zariski closures of the orbits of 11 and 21 rigid superalgebras, respectively. In both cases, the irreducible components of the varieties are described. Furthermore, we exhibit a four-dimensional solvable rigid Jordan superalgebra, showing that an analogue to the Vergne conjecture for Jordan superalgebras does not hold.
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