We classify up to isomorphism the gradings by arbitrary groups on the exceptional classical simple Lie superalgebras G(3), F(4) and D(2,1;α) over an algebraically closed field of characteristic 0. To achieve this, we apply the recent method developed by A. Elduque and M. Kochetov to the known classification of fine gradings up to equivalence on the same superalgebras, which was obtained by C. Draper et al. in 2011. We also classify gradings on the simple Lie superalgebra A(1,1), whose automorphism group is different from the other members of the A series.
Group gradings on exceptional simple Lie superalgebras
Sebastiano Argenti;
2025-01-01
Abstract
We classify up to isomorphism the gradings by arbitrary groups on the exceptional classical simple Lie superalgebras G(3), F(4) and D(2,1;α) over an algebraically closed field of characteristic 0. To achieve this, we apply the recent method developed by A. Elduque and M. Kochetov to the known classification of fine gradings up to equivalence on the same superalgebras, which was obtained by C. Draper et al. in 2011. We also classify gradings on the simple Lie superalgebra A(1,1), whose automorphism group is different from the other members of the A series.File in questo prodotto:
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