Regularity of CR mappings between algebraic hypersurfaces
摘要
We prove that if and are algebraic hypersurfaces in , i.e. both defined by the vanishing of real polynomials, then any sufficiently smooth CR mapping with Jacobian not identically zero extends holomorphically provided the hypersurfaces are holomorphically nondegenerate . Conversely, we prove that holomorphic nondegeneracy is necessary for this property of CR mappings to hold. For the case of unequal dimensions, we also prove that if is an algebraic hypersurface in which does not contain any complex variety of positive codimension and is the sphere in , then extendability holds for all CR mappings with certain minimal a priori regularity. Theorem A. Let and be two algebraic hypersurfaces in and assume that is connected and holomorphically nondegenerate. If is a smooth CR mapping from to with , where is the Jacobian determinant of , then extends holomorphically in an open neighborhood of in . A recent example given by Ebenfelt shows that the conclusion of Theorem A need not hold if is real analytic, but not algebraic. Theorem B. Let be a connected real analytic hypersurface in which is holomorphically degenerate at some point . Let and suppose there exists a germ at of a smooth CR function on which does not extend holomorphically to any full neighborhood of in . Then there exists a germ at of a smooth CR diffeomorphism from into itself, fixing , which does not extend holomorphically to any neighborhood of in . Theorem C. Let be an algebraic hypersurface. Assume that there is no nontrivial complex analytic variety contained in through , and let be the D'Angelo type. If is a CR map of class , where denotes the boundary of the unit ball in , then admits a holomorphic extension in a neighborhood of .
引用
@article{arxiv.math/9505202,
title = {Regularity of CR mappings between algebraic hypersurfaces},
author = {M. S. Baouendi and Xiaojun Huang and Linda Preiss Rothschild},
journal= {arXiv preprint arXiv:math/9505202},
year = {2016}
}