Approximation in the mean by rational functions II
Abstract
For , a compact subset , and a finite positive measure supported on , denotes the closure in of rational functions with poles off . Conway and Yang (2019) introduced the concept of non-removable boundary and removable set for . We continue the previous work and obtain structural results for . Assume that , the multiplication by on , is pure ( does not have summand). Let be the weak closure in of the functions that are bounded analytic off compact subsets of , where denotes the area measure restricted to . is -connected ( denotes analytic capacity) if for any two disjoint open set and with , then or . We prove: (1) contains no non-trivial characterization functions if and only if the removable set is -connected. (2) There is an isometric isomorphism and a weak homeomorphism from onto .
Cite
@article{arxiv.1907.04287,
title = {Approximation in the mean by rational functions II},
author = {Liming Yang},
journal= {arXiv preprint arXiv:1907.04287},
year = {2019}
}
Comments
We have merged the results to arXiv:1904.06446