Norm preserving extensions of bounded holomorphic functions

Abstract

A relatively polynomially convex subset V of a domain has the extension property if for every polynomial p there is a bounded holomorphic function φ on that agrees with p on V and whose H∞ norm on equals the sup-norm of p on V. We show that if is either strictly convex or strongly linearly convex in C2, or the ball in any dimension, then the only sets that have the extension property are retracts. If is strongly linearly convex in any dimension and V has the extension property, we show that V is a totally geodesic submanifold. We show how the extension property is related to spectral sets.