Constanza Rojas-Molina
Published 2017-10-06Version 1
The Anderson model serves to study the absence of wave propagation in a medium in the presence of impurities, and is one of the most studied examples in the theory of quantum disordered systems. In these notes we give a review of the spectral and dynamical properties of the Anderson Model on discrete structures, like the $d$-dimensional square lattice and the Bethe lattice, and the methods used to prove localization. These notes are based on a course given at the CIMPA School "Spectral Theory of Graphs and Manifolds" in Kairouan, 2016.
Comments: 41 pages, diagrams and figures
Random Schrödinger Operators and Anderson localization in aperiodic media
Ballistic Behavior for Random Schrödinger Operators on the Bethe Strip
Some new estimates on the spectral shift function associated with random Schrödinger operators
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