We introduce the notion of regular (boundary) poles for infinitesimal generators of semigroups of holomorphic self-maps of the unit disc. We characterize such regular poles in terms of beta-points (i.e., pre-images of values with positive Carleson-Makarov beta-numbers) of the associated semigroup and of the associated Konigs intertwining function. We also define a natural duality operation in the cone of infinitesimal generators and show that the regular poles of an infinitesimal generator correspond to the regular null poles of the dual generator. Finally we apply such a construction to study radial multi-slits and give an example of a nonisolated radial slit whose tip does not have not a positive Carleson-Makarov beta-number.
Bracci, F., Contreras, M., Diaz Madrigal, S. (2013). Regular Poles and beta-Numbers in the Theory of Holomorphic Semigroups. CONSTRUCTIVE APPROXIMATION, 37(3), 357-381 [10.1007/s00365-013-9180-8].
Regular Poles and beta-Numbers in the Theory of Holomorphic Semigroups
BRACCI, FILIPPO;
2013-01-01
Abstract
We introduce the notion of regular (boundary) poles for infinitesimal generators of semigroups of holomorphic self-maps of the unit disc. We characterize such regular poles in terms of beta-points (i.e., pre-images of values with positive Carleson-Makarov beta-numbers) of the associated semigroup and of the associated Konigs intertwining function. We also define a natural duality operation in the cone of infinitesimal generators and show that the regular poles of an infinitesimal generator correspond to the regular null poles of the dual generator. Finally we apply such a construction to study radial multi-slits and give an example of a nonisolated radial slit whose tip does not have not a positive Carleson-Makarov beta-number.File | Dimensione | Formato | |
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