A geometric approach to Catlin's boundary systems

Abstract

For a point p in a smooth real hypersurface M⊂n, where the Levi form has the nontrivial kernel K10p, we introduce an invariant cubic tensor τ3p Tp × K10p × K10p (Tp/Hp), which together with Ebenfelt's tensor 3, constitutes the full set of 3rd order invariants of M at p. Next, in addition, assume M⊂n to be (weakly) pseudoconvex. Then τ3p must identically vanish. In this case we further define an invariant quartic tensor τ4p Tp × Tp × K10p× K10p (Tp/Hp), and for every q=0, …, n-1, an invariant submodule sheaf of (1,0) vector fields in terms of the Levi form, and an invariant ideal sheaf of complex functions generated by certain derivatives of the Levi form, such that the set of points of Levi rank q is locally contained in certain real submanifolds defined by real parts of the functions in the ideal sheaf, whose tangent spaces have explicit algebraic description in terms of the quartic tensor τ4. Finally, we relate the introduced invariants with D'Angelo's finite type, Catlin's mutlitype and Catlin's boundary systems.