Katrin Fässler, Tuomas Orponen
Published 2019-01-15Version 1
A theorem of Dorronsoro from the 1980s quantifies the fact that real-valued Sobolev functions on Euclidean spaces can be approximated by affine functions almost everywhere, and at all sufficiently small scales. We prove a variant of Dorronsoro's theorem in Heisenberg groups: functions in horizontal Sobolev spaces can be approximated by affine functions which are independent of the last variable. As an application, we deduce new proofs for certain vertical vs. horizontal Poincar\'e inequalities for real-valued functions on the Heisenberg group, originally due to Austin-Naor-Tessera and Lafforgue-Naor.
Area-minimizing ruled graphs and the Bernstein problem in the Heisenberg group
Extensions and corona decompositions of low-dimensional intrinsic Lipschitz graphs in Heisenberg groups
$L^p$ regularity for a class of averaging operators on the Heisenberg group
![QR code for arXiv:1901.04767 [math.CA]](http://oss.arxitics.com/images/favicon.svg)