English

Separate real analiticity and CR extendibility

Complex Variables 2007-05-23 v1

Abstract

In \C2=R2+iR2\C^2=\R^2+i\R^2 with coordinates z=(z1,z2),z=x+iyz=(z_1,z_2), z=x+iy, we consider a function ff continuous on a domain Ω\Omega of R2\R^2 separately real analytic in x1x_1 and CR extendible to y2y_2 (resp. CR extendible to y2>0y_2>0). This means that f(,x2)f(\cdot,x_2) extends holomorphically for y1<ϵx2|y_1|<\epsilon_{x_2} and f(x1,)f(x_1,\cdot) for y2<ϵ| y_2|<\epsilon (resp. 0y2<ϵ0\leq y_2<\epsilon continuous up to y2=0y_2=0) with ϵ\epsilon independent of x1x_1. We prove in Theorem 3.4 that ff is then real analytic (resp. in Theorem 3.5 that it extends holomorphically to a "wedge" W=Ω+iΓϵW= \Omega+i\Gamma_\epsilon where Γϵ\Gamma_\epsilon is an open cone trumcated by y<ϵ|y|<\epsilon and containing the ray 0<y2<ϵ)0<y_2<\epsilon).

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Cite

@article{arxiv.math/0606390,
  title  = {Separate real analiticity and CR extendibility},
  author = {L. Baracco and G. Zampieri},
  journal= {arXiv preprint arXiv:math/0606390},
  year   = {2007}
}

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13 pages