The equivalence problem for 5-dimensional Levi degenerate CR manifolds

Abstract

Let M be a CR manifold of hypersurface type, which is Levi degenerate but also satisfying a k-nondegeneracy condition at all points. This might be only if dim M is greater than or equal to 5 and if dim M = 5, then k= 2 at all points. We prove that for any 5-dimensional, uniformly 2-nondegenerate CR manifold M there exists a canonical Cartan connection, modelled on a suitable projective completion of the tube over the future light cone z∈ C3: (x1)2+(x2)2-(x3)2 = 0, x3>0. This determines a complete solution to the equivalence problem for this class of CR manifolds.