Embedded Three Dimensional CR Manifolds and the Non-Negativity of Paneitz Operators

Abstract

Let be a bounded strictly pseudoconvex domain in C2 with a smooth, connected and compact boundary M and having a CR structure J0 induced from C2. Assume this CR structure has zero Webster torsion. Then if we deform the CR structure through real-analytic dependence on the deformation parameter and such that each deformed structure along the deformation path is smooth and embeddable in C2, we show that for small deformations of the CR structure J from J0, the associated CR Paneitz operator for J is non-negative. We also show that the Webster curvature for any ellipsoid in C2 is positive. The results in this paper complement and provide partial converses to our earlier paper, (to appear Duke Math. J.) arxiv: 1007.5020.