Modifications of the Levi core

Abstract

We construct a family of subdistributions of the Levi core C(N) called modified Levi cores \MCA\A indexed over closed distributions A that contain the Levi null distribution N and are contained in the complex tangent bundle T1, 0b of a smooth bounded pseudoconvex domain . We show that Catlin's Property (P) holds on b if and only if Property (P) holds on the support of one, and hence all, of the modified Levi cores. In C2, all of the modified Levi cores coincide. For a smooth bounded pseudoconvex complete Hartogs domain in C2 that satisfies Property (P), we show that its modified Levi core is trivial. This contrasts with C(N), which can be nontrivial for such domains.