Cauchy transform and uniform approximation by polynomial modules

Abstract

For a compact subset K of the complex plane C, let C(K) denote the algebra of continuous functions on K. For an open subset U ⊂ K, let A(K,U) ⊂ C(K) be the algebra of functions that are analytic in U. We show that there exists φ∈ A(K,U) so that each f∈ A(K,U) can uniformly be approximated by \pn + qnφ\ on K, where pn and qn are analytic polynomials in z. In particular, φ can be chosen as a Cauchy transform of a finite positive measure η compactly supported in C U. Recent developments of analytic capacity and Cauchy transform provide us useful tools in our proofs.