THE SPECTRUM OF THE WEAKLY COUPLED FIBONACCI HAMILTONIAN

Q3 Mathematics
D. Damanik, A. Gorodetski
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引用次数: 26

Abstract

We consider the spectrum of the Fibonacci Hamiltonian for small values of the coupling constant. It is known that this set is a Cantor set of zero Lebesgue measure. Here we study the limit, as the value of the coupling constant approaches zero, of its thickness and its Hausdorff dimension. We announce the following results and explain some key ideas that go into their proofs. The thickness tends to infinity and, consequently, the Hausdorff di- mension of the spectrum tends to one. Moreover, the length of every gap tends to zero linearly. Finally, for sufficiently small coupling, t sum of the spec- trum with itself is an interval. This last result provides a rigorous explanation of a phenomenon for the Fibonacci square lattice discovered numerically by Even-Dar Mandel and Lifshitz.
弱耦合斐波那契哈密顿函数的谱
我们考虑小耦合常数值的斐波那契哈密顿谱。已知该集合是零勒贝格测度的康托集。这里我们研究了当耦合常数的值趋近于零时,其厚度和豪斯多夫维数的极限。我们宣布以下结果,并解释其证明中的一些关键思想。厚度趋于无穷大,因此,光谱的豪斯多夫维数趋于1。此外,每个间隙的长度线性地趋于零。最后,对于足够小的耦合,谱与自身的和是一个区间。最后一个结果为偶数-达尔·曼德尔和Lifshitz用数值方法发现的斐波那契方格格现象提供了一个严格的解释。
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来源期刊
CiteScore
0.90
自引率
0.00%
发文量
0
审稿时长
>12 weeks
期刊介绍: Electronic Research Archive (ERA), formerly known as Electronic Research Announcements in Mathematical Sciences, rapidly publishes original and expository full-length articles of significant advances in all branches of mathematics. All articles should be designed to communicate their contents to a broad mathematical audience and must meet high standards for mathematical content and clarity. After review and acceptance, articles enter production for immediate publication. ERA is the continuation of Electronic Research Announcements of the AMS published by the American Mathematical Society, 1995—2007
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