Accidental CR structures

Abstract

We noticed a discrepancy between \'Elie Cartan and Sigurdur Helgason about the lowest possible dimension in which the simple exceptional Lie group E8 can be realized. This raised the question about the lowest dimensions in which various real forms of the exceptional groups E can be realized. Cartan claims that E6 can be realized in dimension 16. However Cartan refers to the complex group E6, or its split real form EI. His claim is also valid in the case of the real form denoted by EIV. We find however that the real forms EII and EIII of E6 can not be realized in dimension 16 \`a la Cartan. In this paper we realize them in dimension 24 as groups of CR automorphisms of certain CR structures of higher codimension. As a byproduct of these two realizations, we provide a full list of CR structures (M,H,J) and their CR embeddings in an appropriate CN, which satisfy the following conditions: (1) they have real codimension k>1, (2) the real vector distribution H proper for the action of the complex structure J is such that [H,H]+H=TM, (3) the local group GJ of CR automorphisms of the structure (M,H,J) is simple, acts transitively on M and has isotropy P being a parabolic subgroup in GJ, (4) the local symmetry group G of the vector distribution H on M coincides with the group GJ of CR automorphisms of (M,H,J). Because all the CR structures from our list satisfy the last property we call them accidental. Our CR structures of higher codimension with the exceptional symmetries EII and EIII are particular entries in this list.