Infinitesimal Carleson property for weighted measures induced by analytic self-maps of the unit disk

Abstract

We prove that, for every α > -1, the pull-back measure φ ( Aα) of the measure d Aα (z) = (α + 1) (1 - |z|2)α \, d A (z), where A is the normalized area measure on the unit disk , by every analytic self-map φ is not only an (α + 2)-Carleson measure, but that the measure of the Carleson windows of size h is controlled by α + 2 times the measure of the corresponding window of size h. This means that the property of being an (α + 2)-Carleson measure is true at all infinitesimal scales. We give an application by characterizing the compactness of composition operators on weighted Bergman-Orlicz spaces.