Sobolev spaces and Poincaré inequalities  on the Vicsek fractal

Fabrice Baudoin; Li Chen

doi:10.54330/afm.122168

Sobolev spaces and Poincaré inequalities on the Vicsek fractal

Authors

Fabrice Baudoin University of Connecticut, Department of Mathematics
Li Chen Louisiana State University, Department of Mathematics

DOI: https://doi.org/10.54330/afm.122168

Keywords:

Vicsek set, Sobolev spaces, Poincaré inequalities, p-energies, real interpolation

Abstract

In this paper we prove that several natural approaches to Sobolev spaces coincide on the Vicsek fractal. More precisely, we show that the metric approach of Korevaar-Schoen, the approach by limit of discrete \(p\)-energies and the approach by limit of Sobolev spaces on cable systems all yield the same functional space with equivalent norms for \(p>1\). As a consequence we prove that the Sobolev spaces form a real interpolation scale. We also obtain \(L^p\)-Poincaré inequalities for all values of \(p \ge 1\).

Issue

Vol. 48 No. 1 (2023)

Section

Articles

Published

2022-10-06

How to Cite

Baudoin, F., & Chen, L. (2022). Sobolev spaces and Poincaré inequalities on the Vicsek fractal. Annales Fennici Mathematici, 48(1), 3–26. https://doi.org/10.54330/afm.122168

Download Citation

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