Currents in Heisenberg groups
Metric Geometry
2025-12-08 v2
Abstract
There are three approaches to currents tuned to the anisotropic geometry of Heisenberg groups: Ambrosio and Kirchheim's approach valid for general metric spaces; distributions dual to horizontal differential forms; distributions dual to Rumin's complex. It is shown that, in dimensions less than half the ambient dimension, these three theories coincide. On the other hand, they diverge beyond middle dimension: Ambrosio-Kirchheim currents vanish, Rumin currents correspond to a new class of Federer-Fleming currents called oblique currents.
Cite
@article{arxiv.2511.18895,
title = {Currents in Heisenberg groups},
author = {Bruno Franchi and Pierre Pansu},
journal= {arXiv preprint arXiv:2511.18895},
year = {2025}
}
Comments
Added a reference to M. Williams' work, and changed the introduction accordingly