A Lie-theoretic Construction of Cartan-Moser Chains

Abstract

Let M3 ⊂ C2 be a Cω Levi nondegenerate hypersurface. In the literature, Cartan-Moser chains are detected from rather advanced considerations: either from the construction of a Cartan connection associated with the CR equivalence problem; or from the construction of a formal or converging Poincar\'e-Moser normal form. This note provides an alternative direct elementary construction, based on the inspection of the Lie prolongations of 5 infinitesimal holomorphic automorphisms to the space of second order jets of CR-transversal curves. Within the 4-dimensional jet fiber, the orbits of these 5 prolonged fields happen to have a simple cubic 2-dimensional degenerate exceptional orbit, the chain locus: \[ 0 \,:=\, \ (x1,y1,x2,y2) ∈ R4 \,\, x2 = -2x12y1-2y13,\,\,\, y2 = 2x1y12 + 2x13 \. \] By plain translations, we may capture all points by working only at one point, the origin, and computations, although conceptually enlightening, become disappointingly simple.