Free CR distributions

Abstract

There are only some exceptional CR dimensions and codimensions such that the geometries enjoy a discrete classification of the pointwise types of the homogeneous models. The cases of CR dimensions n and codimensions n2 are among the very few possibilities of the so called parabolic geometries. Indeed, the homogeneous model turns out to be (n+1,n)/P with a suitable parabolic subgroup P. We study the geometric properties of such real (2n+n2)-dimensional submanifolds in Cn+n2 for all n>1. In particular we show that the fundamental invariant is of torsion type, we provide its explicit computation, and we discuss an analogy to the Fefferman construction of a circle bundle in the hypersurface type CR geometry.