Isoperimetric and Poincaré inequalities on non-self-similar Sierpiński sponges : the borderline case
Eriksson-Bique, Sylvester; Gong, Jasun
Eriksson-Bique, S. & Gong, J. (2022). Isoperimetric and Poincaré Inequalities on Non-Self-Similar Sierpiński Sponges: the Borderline Case. Analysis and Geometry in Metric Spaces, 10(1), 373-393. https://doi.org/10.1515/agms-2022-0144
© 2022 Sylvester Eriksson-Bique and Jasun Gong, published by De Gruyter. This work is licensed under the Creative Commons Attribution 4.0 License.
https://creativecommons.org/licenses/by/4.0/
https://urn.fi/URN:NBN:fi-fe2023050340524
Tiivistelmä
Abstract
In this paper we construct a large family of examples of subsets of Euclidean space that support a 1-Poincaré inequality yet have empty interior. These examples are formed from an iterative process that in-volves removing well behaved domains, or more precisely, domains whose complements are uniform in the sense of Martio and Sarvas. While existing arguments rely on explicit constructions of Semmes families of curves, we include a new way of obtaining Poincaré inequalities through the use of relative isoperimetric inequalities, after Korte and Lahti. To do so, we further introduce the notion of of isoperimetric inequalities at given density levels and a way to iterate suc inequalities. These tools are presented and apply to general metric measure measures. Our examples subsume the previous results of Mackay, Tyson, and Wildrick regarding non-self similar Sierpiński carpets, and extend them to many more general shapes as well as higher dimensions.
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