Left-invariant Pseudo-Riemannian metrics on Lie groups: The null cone II

Abstract

We continue to study left-invariant pseudo-Riemannian metrics on Lie groups being in the null cone of the O(p,q)-action using the moving bracket approach. In particular, the Lie algebra being in the null cone implies that the pseudo-Riemannian metric have all vanishing scalar curvature invariants (VSI). We consider all Lie algebras of dimension ≤ 6 and we find that all solvable Lie algebras, and non-trivially Levi-decomposable Lie algebras, of dimension ≤ 6 are in the null cone, except the 3-dimensional solvable Lie algebra s3,3. For g semi-simple, we also give a construction where gm is in the null cone and give examples of such spaces for all the real simple Lie algebras g. For example, for the exceptional split groups this construction places the split e66, split e77 and split e88 in the null cone of the O(42,42), O(70.70) and O(128,128) action, respectively, and hence, their corresponding left-invariant pseudo-Riemannian metrics are VSI.

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