Invariant holomorphic foliations on Kobayashi hyperbolic homogeneous manifolds

Abstract

Let M be a Kobayashi hyperbolic homogenous manifold. Let F be a holomorphic foliation on M invariant under a transitive group G of biholomorphisms. We prove that the leaves of F are the fibers of a holomorphic G-equivariant submersion π M N onto a G-homogeneous complex manifold N. We also show that if Q is an automorphism family of a hyperbolic convex (possibly unbounded) domain D in Cn, then the fixed point set of Q is either empty or a connected complex submanifold of D.