Subspaces of 7 x 7 skew-symmetric matrices related to the group G2

Abstract

Let K be a field of characteristic different from 2 and let C be an octonion algebra over K. We show that there is a seven-dimensional subspace of 7× 7 skew-symmetric matrices over K which is invariant under the automorphism group of C. This subspace consists of elements of rank 6 when C is a division algebra, and elements of rank 4 and 6 when C is a split algebra. In the latter case, the automorphism group is the exceptional group G2(K).