Extension of Arakelyan's Theorem

Abstract

Arakeljan's Theorem provides conditions on a relatively closed subset F of a domain G⊂C, such that any continuous function f:F→C that is analytic in F, can be approximated by analytic functions defined on G. In this paper we will extend Arakeljan's theorem by adding the extra requirement that the analytic functions that approximate f may also be chosen to be bounded on a closed set C⊂ G. In RU the same problem has been considered but for the specific case that G=C. In this paper we will extend the result in RU and show that is true for an arbitrary G, provided that F and C satisfy certain topological condition in G. Additionally, we will show that the result holds always true when G is simply connected.