5 × 5-graded Lie algebras, cubic norm structures and quadrangular algebras
Abstract
We study simple Lie algebras generated by extremal elements, over arbitrary fields of arbitrary characteristic. We show: (1) If the extremal geometry contains lines, then the Lie algebra admits a 5 × 5-grading that can be parametrized by a cubic norm structure; (2) If there exists a field extension of degree at most 2 such that the extremal geometry over that field extension contains lines, and in addition, there exist symplectic pairs of extremal elements, then the Lie algebra admits a 5 × 5-grading that can be parametrized by a quadrangular algebra. One of our key tools is a new definition of exponential maps that makes sense even over fields of characteristic 2 and 3, which ought to be interesting in its own right.
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