Pure Point Spectrum for the Laplacian on Unbounded Nested Fractals
✍ Scribed by Christophe Sabot
- Publisher
- Elsevier Science
- Year
- 2000
- Tongue
- English
- Weight
- 208 KB
- Volume
- 173
- Category
- Article
- ISSN
- 0022-1236
No coin nor oath required. For personal study only.
✦ Synopsis
We prove for the class of nested fractals introduced by T. Lindstro% m (1990, Memoirs Amer. Math. Soc. 420) that the integrated density of states is completely created by the so-called Neuman Dirichlet eigenvalues. The corresponding eigenfunctions lead to eigenfunctions with compact support on the unbounded set and we prove that for a large class of blow-ups the set of Neuman Dirichlet eigenfunctions is complete, leading to a pure point spectrum with compactly supported eigenfunctions. This generalizes previous results of H. Teplyaev (1998, J. Funct. Anal. 159, 537 567) on the Sierpinski Gasket. Our methods are elementary and use only symmetry arguments via the representations of the symmetry group of the set.