Holomorphic approximation by polynomials with exponents restricted to a convex cone

Abstract

We study the approximation of holomorphic functions of several complex variables by the ring PS(Cn) of polynomials whose exponents are restricted to a convex cone R+S for some compact convex S∈ Rn+. We show a version of the Runge-Oka-Weil Theorem on approximation by these subrings on compact subsets of C*n that are convex with respect to PS(Cn). We show a sharper result on rotationally symmetric compact sets. The tools used are H\"ormander's L2-theory and Siciak-Zakharyuta functions VSK associated to S. We provide a formula for VSK when K is a rotationally symmetric compact subset of C*n.