Hyperbolicity of the sub-Riemannian affine-additive group

Zoltán M. Balogh; Elia Bubani; Ioannis D. Platis

doi:10.54330/afm.178298

Hyperbolicity of the sub-Riemannian affine-additive group

Authors

Zoltán M. Balogh Universität Bern, Mathematisches Institut (MAI)
Elia Bubani University of Fribourg, Department of Mathematics
Ioannis D. Platis University of Patras, Department of Mathematics

DOI:

https://doi.org/10.54330/afm.178298

Keywords:

Quasiconformal maps, sub-Riemannian metric, Heisenberg group

Abstract

We consider the affine-additive group as a metric measure space with a canonical left-invariant measure and a left-invariant sub-Riemannian metric. We prove that this metric measure space is locally 4-Ahlfors regular and it is hyperbolic, meaning that it has a non-vanishing 4-capacity at infinity. This implies that the affine-additive group is not quasiconformally equivalent to the Heisenberg group or to the roto-translation group in contrast to the fact that both of these groups are globally contactomorphic to the affine-additive group. Moreover, each quasiregular map, from the Heisenberg group to the affine-additive group must be constant.

Downloads

Published

2025-12-12

Issue

Vol. 50 No. 2 (2025)

Section

Articles

License

This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.

How to Cite

Balogh, Z. M., Bubani, E., & Platis, I. D. (2025). Hyperbolicity of the sub-Riemannian affine-additive group. Annales Fennici Mathematici, 50(2), 779–793. https://doi.org/10.54330/afm.178298

Download Citation