G-equivariant embedding theorems for CR manifolds of high codimension

Abstract

Let (X,T1,0X) be a (2n+1+d)-dimensional compact CR manifold with codimension d+1, d≥1, and let G be a d-dimensional compact Lie group with CR action on X and T be a globally defined vector field on X such that C TX=T1,0X T0,1X C T Cg, where g is the space of vector fields on X induced by the Lie algebra of G. In this work, we show that if X is strongly pseudoconvex in the direction of T and n≥ 2, then there exists a G-equivariant CR embedding of X into CN, for some N∈ N. We also establish a CR orbifold version of Boutet de Monvel's embedding theorem.