Harmonic Gradients on Higher Dimensional Sierpinski Gaskets
Classical Analysis and ODEs
2020-12-02 v1
Abstract
We consider criteria for the differentiability of functions with continuous Laplacian on the Sierpinski Gasket and its higher-dimensional variants , , proving results that generalize those of Teplyaev. When is equipped with the standard Dirichlet form and measure we show there is a full -measure set on which continuity of the Laplacian implies existence of the gradient , and that this set is not all of . We also show there is a class of non-uniform measures on the usual Sierpinski Gasket with the property that continuity of the Laplacian implies the gradient exists and is continuous everywhere, in sharp contrast to the case with the standard measure.
Cite
@article{arxiv.1908.10539,
title = {Harmonic Gradients on Higher Dimensional Sierpinski Gaskets},
author = {Luke Brown and Giovanni Ferrer and Gamal Mograby and Luke G. Rogers and Karuna Sangam},
journal= {arXiv preprint arXiv:1908.10539},
year = {2020}
}
Comments
9 pages