Horocyclic harmonic Bergman spaces on homogeneous trees

Abstract

The main focus of this contribution is on the harmonic Bergman spaces Bαp on the q-homogeneous tree Xq endowed with a family of measures σα that are constant on the horocycles tangent to a fixed boundary point and turn out to be doubling with respect to the corresponding horocyclic Gromov distance. A central role is played by the reproducing kernel Hilbert space Bα2 for which we find a natural orthonormal basis and formulae for the kernel. We also consider the atomic Hardy space and the bounded mean oscillation space. Appealing to an adaptation of Calder\'on-Zygmund theory and to standard boundedness results for integral operators on Lpα spaces with H\"ormander-type kernels, we determine the boundedness properties of the Bergman projection.