Representations of the Grassmann Poisson superalgebras
Abstract
We prove that every irreducible Poisson supermodule over the Grassmann Poisson superalgebra Gn over a field of characteristic different from 2 is isomorphic to the regular Poisson supermodule Reg\,Gn or to its opposite supermodule. Moreover, every unital Poisson supermodule over Gn is completely reducible. If P is a unital Poisson superalgebra which contains Gn with the same unit then P Q Gn for some Poisson superalgebra Q. Furthermore, we classify the supermodules over Gn in the category of dot-bracket superalgebras with Jordan brackets, and we prove that every irreducible Jordan supermodule over the Kantor double Kan\,Gn is isomorphic to the supermodule Kan\,V, where V is an irreducible dot-bracket supermodule with a Jordan bracket over Gn.
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