On the holomorphic closure dimension of real analytic sets
Complex Variables
2010-04-16 v3
Abstract
Given a real analytic (or, more generally, semianalytic) set R in the n-dimensional complex space, there is, for every point p in the closure of R, a unique smallest complex analytic germ X_p that contains the germ R_p. We call the complex dimension of X_p the holomorphic closure dimension of R at p. We show that the holomorphic closure dimension of an irreducible R is constant on the complement of a closed proper analytic subset of R, and discuss the relationship between this dimension and the CR dimension of R.
Keywords
Cite
@article{arxiv.0804.4511,
title = {On the holomorphic closure dimension of real analytic sets},
author = {Janusz Adamus and Rasul Shafikov},
journal= {arXiv preprint arXiv:0804.4511},
year = {2010}
}
Comments
12 pages