English

Approximation in the mean by rational functions II

Functional Analysis 2019-11-20 v3

Abstract

For 1t<1\le t < \infty, a compact subset KCK\subset\mathbb C, and a finite positive measure μ\mu supported on KK, Rt(K,μ)R^t(K, \mu) denotes the closure in Lt(μ)L^t(\mu) of rational functions with poles off KK. Conway and Yang (2019) introduced the concept of non-removable boundary F\mathcal F and removable set R=KF\mathcal R = K\setminus \mathcal F for Rt(K,μ)R^t(K, \mu). We continue the previous work and obtain structural results for Rt(K,μ)R^t(K, \mu). Assume that SμS_\mu, the multiplication by zz on Rt(K,μ)R^t(K, \mu), is pure (Rt(K,μ)R^t(K, \mu) does not have LtL^t summand). Let HR(AR)H^\infty_{\mathcal R}(A_{\mathcal R}) be the weak^* closure in L(AR)L^\infty (A_{\mathcal R}) of the functions that are bounded analytic off compact subsets of F\mathcal F, where ARA_{\mathcal R} denotes the area measure restricted to R\mathcal R. R\mathcal R is γ\gamma-connected (γ\gamma denotes analytic capacity) if for any two disjoint open set G1G_1 and G2G_2 with RG1G2 γa.a.\mathcal R \subset G_1 \cup G_2 ~\gamma-a.a., then RG1 γa.a.\mathcal R \subset G_1 ~\gamma-a.a. or RG2 γa.a.\mathcal R \subset G_2 ~\gamma-a.a.. We prove: (1) Rt(K,μ)R^t(K, \mu) contains no non-trivial characterization functions if and only if the removable set R\mathcal R is γ\gamma-connected. (2) There is an isometric isomorphism and a weak^* homeomorphism from Rt(K,μ)L(μ)R^t(K, \mu)\cap L^\infty(\mu ) onto HR(AR)H^\infty_{\mathcal R}(A_{\mathcal R }).

Keywords

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

R2 v1 2026-06-23T10:16:31.075Z