Apα classes in the Dirichlet range: inner-outer factorization, Carleson measures and weak products

Abstract

We study properties of Apα spaces in the Dirichlet range, recently defined by Brevig, Kulikov, Seip and Zlotnikov as the set of all holomorphic functions on the unit disc D such that \[ ∫D |f(z)|p-2 |f'(z)|2 (1 - |z|2)α \, dA(z) < ∞, \] when 0<α < 1 and p > 0. We answer in the negative two questions posed by Brevig et al. by showing that, if p2 and p > 12, Apα is not a vector space and that the norm is in general not increasing in p. This is achieved by means of an equivalent description for Apα which is given in terms of the Poisson integral of the boundary function of its inhabitants. Such norm also leads to a description of Apα functions in the Dirichlet range given in terms of their inner and outer factors. As a corollary, we show that A1α is contained in the weak product of a Dirichlet-type space.