A note on function algebras on disks

Abstract

Let D be a closed disk in the complex plane centered at the origin, f, g complex valued continuous function on D. Let P[f,g; D] (res. R[f, g; D])) be the uniform closure on D of polynomials (res. rational functions) in variables f and g. In OS, using complex dynamical systems, O'Farrell and Sanabria-Garcia proved that \(z2, z1+z): z∈ D\ is not polynomially convex with D small enough and so that P[z2, z1+ z; D] C(D) if D is sufficient small. In this paper, we first give a certain conditions for rational convexity of union of two compact set of Cn and apply to show that R[z2, z1+ z; D]= C(D) for all D small enough