Analysis of the Laplacian and spectral operators on the Vicsek set
Sarah Constantin Robert S. Strichartz Miles Wheeler
Communications on Pure & Applied Analysis 2011, 10(1): 1-44 doi: 10.3934/cpaa.2011.10.1
We study the spectral decomposition of the Laplacian on a family of fractals $\mathcal{VS}_n$ that includes the Vicsek set for $n=2$, extending earlier research on the Sierpinski Gasket. We implement an algorithm [23] for spectral decimation of eigenfunctions of the Laplacian, and explicitly compute these eigenfunctions and some of their properties. We give an algorithm for computing inner products of eigenfunctions. We explicitly compute solutions to the heat equation and wave equation for Neumann boundary conditions. We study gaps in the ratios of eigenvalues and eigenvalue clusters. We give an explicit formula for the Green's function on $\mathcal{VS}_n$. Finally, we explain how the spectrum of the Laplacian on $\mathcal{VS}_n$ converges as $n \to \infty$ to the spectrum of the Laplacian on two crossed lines (the limit of the sets $\mathcal{VS}_n$.)
keywords: Vicsek set Laplacians on fractals Green's function eigenvalue ratio gaps. eigenvalue clusters wave propagators Weyl ratio spectral operators heat kernels

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