English

The Runge approximation theorem for generalized polynomial hulls

Complex Variables 2007-05-23 v1

Abstract

It is known from the Runge approximation theorem that every function which is holomorphic in a neighborhood of a compact polynomially convex set K\complexesnK\subset \complexes^{n} can be approximated uniformly on KK by analytic polynomials. We shall here prove the same result when the role of the polynomially convex hull K^\hat {K} is played by the generalized polynomial hull hq(K)h_{q}(K) introduced by Basener and which can be defined, for each integer q0,...,n1q\in {0,...,n-1}, by hq(K)=P\complexes[z1,...,zn]APh_{q}(K)=\displaystyle\bigcup_{P\in \complexes [z_{1},...,z_{n}]} A_{P} where AP={z\complexesn:P(z)δK(P,z)}A_{P}=\{z\in \complexes^{n}: |P(z)|\leq \delta_{K}(P,z)\}, and where δK(P,z)\delta_{K}(P,z) denotes the lowest value of PKf1(0)||P||_{K\cap f^{-1}(0)} when ff ranges in the set of holomorphic polynomial maps \complexesn\complexesq\complexes^{n}\to \complexes^{q} vanishing at zz.

Keywords

Cite

@article{arxiv.math/0101175,
  title  = {The Runge approximation theorem for generalized polynomial hulls},
  author = {Youssef Alaoui and My Abdelhakim El Idrissi Saad},
  journal= {arXiv preprint arXiv:math/0101175},
  year   = {2007}
}

Comments

5 pages, no figures, latex