Real Analytic Sets in Complex Spaces and CR maps
Abstract
If R is a real analytic set in n (viewed as 2n), then for any point p∈ R there is a uniquely defined germ Xp of the smallest complex analytic variety which contains Rp, the germ of R at p. It is shown that if R is irreducible of constant dimension, then the function p Xp is constant on a dense open subset of R. As an application it is proved that a continuous map from a real analytic CR manifold M into N which is CR on some open subset of M and whose graph is a real analytic set in M× N is necessarily CR everywhere on M.
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