一维连续安德森哈密顿量的定位交叉

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS ACS Applied Bio Materials Pub Date : 2023-11-03 DOI:10.1007/s00222-023-01225-1
Laure Dumaz, Cyril Labbé
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引用次数: 7

摘要

我们研究了具有白噪声势的连续安德森哈密顿函数$\mathcal{H}_{L}$的谱在一个长度$L$被发送到无穷长的段上的行为。我们放大1阶能级$E$(散装能级)或1阶能级$ L$(交叉能级)。我们证明了特征值和质心的点过程收敛于泊松点过程。我们还以显式的速率证明了本征函数的指数局域化。此外,我们证明了特征函数收敛于良好识别的极限:在交叉区域,这些极限是普遍的。结合我们的同伴论文(Dumaz and labb in Ann)的结果。概率。51(3):805 - 839,2023),这完全确定了$\mathcal{H}_{L}$谱的局域相和非局域相之间的跃迁。两个主要的技术挑战是两点估计或Minami估计的证明,以及对亚椭圆扩散收敛到平衡的估计,其证明依赖于Malliavin演算和亚矫顽力理论。
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Localization crossover for the continuous Anderson Hamiltonian in 1-d
We investigate the behavior of the spectrum of the continuous Anderson Hamiltonian $\mathcal{H}_{L}$ , with white noise potential, on a segment whose size $L$ is sent to infinity. We zoom around energy levels $E$ either of order 1 (Bulk regime) or of order $1\ll E \ll L$ (Crossover regime). We show that the point process of (appropriately rescaled) eigenvalues and centers of mass converge to a Poisson point process. We also prove exponential localization of the eigenfunctions at an explicit rate. In addition, we show that the eigenfunctions converge to well-identified limits: in the Crossover regime, these limits are universal. Combined with the results of our companion paper (Dumaz and Labbé in Ann. Probab. 51(3):805–839, 2023), this identifies completely the transition between the localized and delocalized phases of the spectrum of $\mathcal{H}_{L}$ . The two main technical challenges are the proof of a two-points or Minami estimate, as well as an estimate on the convergence to equilibrium of a hypoelliptic diffusion, the proof of which relies on Malliavin calculus and the theory of hypocoercivity.
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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