Eigenvalue Correlations in Continuum one-dimensional Anderson Models
Robert Sims, G\"unter Stolz
TL;DR
This paper aimed to analyze eigenvalue correlations in continuum one-dimensional Anderson models but was withdrawn due to errors in its proof methods.
Contribution
The paper attempted to establish new results on eigenvalue correlations in Anderson models, but the proof was found to be flawed.
Findings
Methods used are incorrect and lead to contradictions with known results.
The paper was withdrawn and no valid findings are presented.
No new empirical or theoretical results were established.
Abstract
The methods used to prove the main result must be incorrect, as they can be used to arrive at a contradiction with previously known results. Thus the paper was withdrawn.
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Taxonomy
TopicsSpectral Theory in Mathematical Physics · Matrix Theory and Algorithms · Numerical methods in inverse problems