In this paper we discuss the simplicity criteria of (−1, −1)-Freudenthal Kantor triple systems and give examples of such triple systems, from which we can construct some Lie superalgebras. We also show that we can associate a Jordan triple system to any (ε, δ)-Freudenthal Kantor triple system. Further, we introduce the notion of δ-structurable algebras and connect them to (−1, δ)-Freudenthal Kantor triple systems and the corresponding Lie (super)algebra construction.2000 Mathematics subject classification: primary 17A40, 17B60.
In this paper we give by a unified formula the classification of exceptional compact simple Kantor triple systems defined on tensor products of composition algebras corresponding to realifications of exceptional simple Lie algebras.
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