Hua Qiu, Haoran Tian
Published 2016-11-24Version 1
In this paper, we show how to construct the standard Laplacian on the unit square in a self-similar manner. We rewrite the familiar mean value property of planar harmonic functions in terms of averge values on small squares, from which we could know how the planar self-similar resistance form and the Laplacian look like. This approach combines the constructive limit-of-difference-quotients method of Kigami for p.c.f. self-similar sets and the method of averages introduced by Kusuoka and Zhou for the Sierpinski carpet.
Quarklet Characterizations for bivariate Bessel-Potential Spaces on the Unit Square via Tensor Products
A planar bi-Lipschitz extension Theorem
The space $L_1(L_p)$ is primary for $1<p<\infty$
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