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Localization in certain disordered quantum spin chains.
Abstract
The phenomenon of localization in disordered systems was first described by Philip W. Anderson, who highlighted the insulating behavior that certain single-particle lattice models display in the presence of strong disorder. Since then, localization phenomena have been studied in depth. While Anderson localization is well-understood at strong disorder (with mathematical proofs achieved for any dimension), the question whether Anderson insulators retain localization properties in the presence of interactions remains open. In this talk, I will present an overview of the current scope of knowledge on this topic (known as many-body localization, or MBL) and highlight a recent result which aims to set a rigorous mathematical framework for the proof of MBL. Using a multi-scale analysis, one can show absence of diffusion for a robust set of interacting 1D spin chain models. The reasoning leading to this result can be extended to hopefully derive a rigorous proof of MBL, an aspect that is left for further work.
