Observations about the Lie algebra g2 ⊂ so(7), associative 3-planes, and so(4) subalgebras

Abstract

We make several observations relating the Lie algebra g2 ⊂ so(7), associative 3-planes, and so(4) subalgebras. Some are likely well-known but not easy to find in the literature, while other results are new. We show that an element X ∈ g2 cannot have rank 2, and if it has rank 4 then its kernel is an associative subspace. We prove a canonical form theorem for elements of g2. Given an associative 3-plane P in R7, we construct a Lie subalgebra (P) of so(7) = 2 ( R7) that is isomorphic to so(4). This so(4) subalgebra differs from other known constructions of so(4) subalgebras of so(7) determined by an associative 3-plane. These are results of an NSERC undergraduate research project. The paper is written so as to be accessible to a wide audience.