Inner functions as strongly extreme points: stability properties

Abstract

Given a Banach space X, let x be a point in ball( X), the closed unit ball of X. One says that x is a strongly extreme point of ball( X) if it has the following property: for every >0 there is δ>0 such that the inequalities \|x y\|<1+δ imply, for y∈ X, that \|y\|<. We are concerned with certain subspaces of H∞, the space of bounded holomorphic functions on the disk, that arise upon imposing finitely many linear constraints and can be viewed as finite-dimensional perturbations of H∞. It is well known that the strongly extreme points of ball(H∞) are precisely the inner functions, while the (usual) extreme points of this ball are the unit-norm functions f∈ H∞ with (1-|f|) non-integrable over the circle. Here we show that similar characterizations remain valid for our perturbed H∞-type spaces. Also, we investigate to what extent a non-inner function can differ from a strongly extreme point.