渗漏
发表于 2025-3-21 16:23:10
书目名称Spectral Theory of Random Schrödinger Operators影响因子(影响力)<br> http://impactfactor.cn/if/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators影响因子(影响力)学科排名<br> http://impactfactor.cn/ifr/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators网络公开度<br> http://impactfactor.cn/at/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators网络公开度学科排名<br> http://impactfactor.cn/atr/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators被引频次<br> http://impactfactor.cn/tc/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators被引频次学科排名<br> http://impactfactor.cn/tcr/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators年度引用<br> http://impactfactor.cn/ii/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators年度引用学科排名<br> http://impactfactor.cn/iir/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators读者反馈<br> http://impactfactor.cn/5y/?ISSN=BK0873889<br><br> <br><br>书目名称Spectral Theory of Random Schrödinger Operators读者反馈学科排名<br> http://impactfactor.cn/5yr/?ISSN=BK0873889<br><br> <br><br>
ETCH
发表于 2025-3-21 20:28:27
Ergodic Families of Self-Adjoint Operators,of these possibly unbounded operators. We believe that all the technical difficulties relative to these measurability problems have been carefully swept under the rug in most of the research litterature. This is one of the reasons why we decided to study these problems thoroughly.
musicologist
发表于 2025-3-22 03:22:55
Localization in Any Dimension,ial interest. The links between the exponential growth of the solutions of the eigenvalue equation and the exponential decay of the Green’s function have already been pointed out in the one dimensional case.
Dignant
发表于 2025-3-22 04:49:30
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byline
发表于 2025-3-22 10:48:35
Localization in One Dimension, conjectured by Mott & Twose in that this property should hold in the one dimensional case at any disorder. This chapter is devoted to the proof of this last conjecture which we will extend to quasi-one dimensional systems.
chronicle
发表于 2025-3-22 15:52:51
Book 1990ng, the phenomenon can be described as follows: the self-adjoint operators which are used as Hamiltonians for these systems have a ten dency to have pure point spectrum, especially in low dimension or for large disorder. A lot of effort has been devoted to the mathematical study of the random self-
一个姐姐
发表于 2025-3-22 19:25:18
Spectral Theory of Self-Adjoint Operators,ded in the sequel. Because of lack of space, we refrain from explaining the motivations behind the numerous definitions we introduce. We merely illustrate them with examples of Schrödinger operators and we postpone a more detailed study to Chapter II. Rather than a serious introduction to the spectr
提名
发表于 2025-3-22 22:19:05
,Schrödinger Operators,te the abstract theory of Chapter I by the concrete examples of the generalized Laplacian operators in Section II.1 and their perturbations by multiplication operators in Section II.2. The latter are of special importance since they are the Schrödinger operators we want to study. We consider the pro
柱廊
发表于 2025-3-23 03:36:03
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肮脏
发表于 2025-3-23 05:44:59
Products of Random Matrices,t important result in this direction is the extension to matrix valued random variables of the strong law of large numbers. Unfortunately the identification of the limit (called the Lyapunov exponent) is more complicated than in the classical case of real valued random variables. In particular this