English

A general version of the Hartogs extension theorem for separately holomorphic mappings between complex analytic spaces

Complex Variables 2007-05-23 v1

Abstract

Using recent development in Poletsky theory of discs, we prove the following result: Let X,X, YY be two complex manifolds, let ZZ be a complex analytic space which possesses the Hartogs extension property, let AA (resp. BB) be a non locally pluripolar subset of XX (resp. YY). We show that every separately holomorphic mapping f:W:=(A×Y)(X×B)Zf: W:=(A\times Y) \cup (X\times B)\longrightarrow Z extends to a holomorphic mapping f^\hat{f} on W^:={(z,w)X×Y: ω~(z,A,X)+ω~(w,B,Y)<1}\hat{W}:=\left\lbrace(z,w)\in X\times Y:\ \widetilde{\omega}(z,A,X)+\widetilde{\omega}(w,B,Y)<1 \right\rbrace such that f^=f\hat{f}=f on WW^,W\cap \hat{W}, where ω~(,A,X)\widetilde{\omega}(\cdot,A,X) (resp. ω~(,B,Y))\widetilde{\omega}(\cdot,B,Y)) is the plurisubharmonic measure of AA (resp. BB) relative to XX (resp. YY). Generalizations of this result for an NN-fold cross are also given.

Keywords

Cite

@article{arxiv.math/0703736,
  title  = {A general version of the Hartogs extension theorem for separately holomorphic mappings between complex analytic spaces},
  author = {Viet-Anh Nguyen},
  journal= {arXiv preprint arXiv:math/0703736},
  year   = {2007}
}