|3|-gradings of complex simple Lie algebras
Abstract
The aim of this paper is to investigate the algebraic structure that appears on |3|-gradings n=n-3 ·s n3 of a complex simple Lie algebra n. In particular, we completely determine the possible reductive algebras n0 and prove that the only free nilpotent Lie algebra of step 3 that appears as the negative part n-3n-2n-1 of a grading is the usual |3|-grading of the exceptional Lie algebra g2.
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