Algebraicity of holomorphic mappings between real algebraic sets in Cn
Abstract
We give conditions under which a germ of a holomorphic mapping in CN, mapping an irreducible real algebraic set into another of the same dimension, is actually algebraic. Let A⊂ N be an irreducible real algebraic set. Assume that there exists ∈ A such that A is a minimal, generic, holomorphically nondegenerate submanifold at . We show here that if H is a germ at p1 ∈ A of a holomorphic mapping from N into itself, with Jacobian H not identically 0, and H(A) contained in a real algebraic set of the same dimension as A, then H must extend to all of N (minus a complex algebraic set) as an algebraic mapping. Conversely, we show that for any ``model case'' (i.e., A given by quasi-homogeneous real polynomials), the conditions on A are actually necessary for the conclusion to hold.
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