Five-dimensional para-CR manifolds and contact projective geometry in dimension three

Abstract

We study invariant properties of 5-dimensional para-CR structures whose Levi form is degenerate in precisely one direction and which are 2-nondegenerate. We realize that two, out of three, primary (basic) para-CR invariants of such structures are the classical differential invariants known to Monge (1810) and to Wuenschmann (1905) \[ M(G) := 40Gppp3-45GppGpppGpppp+9Gpp2Gppppp, W(H) := 9D2Hr-27DHp-18HrDHr+18HpHr+4Hr3+54Hz. \] The vanishing M(G) 0 provides a local necessary and sufficient condition for the graph of a function in the (p,G)-plane to be contained in a conic, while the vanishing W(H) 0 gives an if-and-only-if condition for a 3rd order ODE to define a natural Lorentzian geometry on the space of its solutions. Mainly, we give a geometric interpretation of the third basic invariant of our class of para-CR structures, the simplest one, of lowest order, and of mixed nature N(G,H):=2Gppp+GppHrr. We establish that the vanishing N(G,H) 0 gives an if-and-only-if condition for the two 3-dimensional quotients of the para-CR manifold by its two canonical integrable rank-2 distributions, to be equipped with contact projective geometries. A curious transformation between the Wuenschmann invariant and the Monge invariant, first noted by us in arXiv:2003.08166, is also discussed, and its mysteries are further revealed.