A logarithmic characterization of Arakelian sets

Abstract

Arakelian's classical approximation theorem Ar gives necessary and sufficient conditions such that functions can be uniformly approximated in (unbounded) closed sets F⊂ C by entire functions. The conditions are purely topological and concern the connectedness of the complement of F. We give a new characterization of Arakelian sets in terms of logarithmic branches of functions f∈ A(F), which are continuous in F and holomorphic in its interior F. Our proof is based on a contradiction argument and the counterexample function that we use is furnished by the Weierstrass factorization theorem.

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