Nullity of the Levi-form and the associated subvarieties for pseudo-convex CR structures of hypersurface type

Abstract

Let M2n+1, n 1, be a smooth manifold with a pseudo-convex integrable CR structure of hypersurface type. We consider a sequence of CR invariant subsets M= S0 ⊃ S1 ⊃ ·s ⊃ Sn, where Sq is the set of points where the Levi-form has nullity q. We prove that Sq's are locally given as common zero sets of the coefficients Aj, j=0,1,…, q-1, of the characteristic polynomial of the Levi-form. Some sufficient conditions for local existence of complex submanifolds are presented in terms of the coefficients Aj.