CR PRODUCTS IN LOCALLY CONFORMAL KÄHLER MANIFOLDS

Abstract

We study CR products (in the sense of Chen (J. Diff. Geom. 16 (1981), 305-322, 493-509)) in locally conformal Kähler (l.c.K.) manifolds. We show that a CR submanifold M^m of a l.c.K. manifold has a parallel f-structure P if and only if it is a restricted CR product (i.e. both the holomorphic and totally real distributions D and D^⊥ are parallel and D has complex dimension 1 whenever M^m is not orthogonal to the Lee field). We study rough CR products, i.e. CR submanifolds in a l.c.K. manifold whose local CR manifolds {M_i}_i∈I are CR products (relative to the local Kähler metrics {g_i}_i∈I of the ambient space). If M^m is a standard rough CR product of a complex Hopf manifold, each leaf of the Levi foliation, orthogonal to the Lee field, is shown to be isometric to the sphere S². Any warped product CR submanifold M^m = M^⊥ ×_f M^T, with M^⊥ anti-invariant and M^T invariant is shown to be a CR product, provided that the tangential component of the Lee field (of the ambient l.c.K. manifold) is orthogonal to M^⊥.