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VERSION:2.0
PRODID:-//Memento EPFL//
BEGIN:VEVENT
SUMMARY:The Kunz-Souillard method revisited
DTSTART:20100525T143000
DTSTAMP:20260408T120148Z
UID:4376f5f0c9f5405a6334d2af98b64443611db993df5d96bdd8f358c9
CATEGORIES:Conferences - Seminars
DESCRIPTION:Günter Stolz\nIn 1980 Kunz and Souillard developed a method w
 hich provided the first mathematically rigorous proof of localization for 
 the discrete one-dimensional Anderson model. While other\, more powerful\,
  methods to prove localization were found later\, the Kunz-Souillard metho
 d has two interesting features which still deserve notice: It directly est
 ablishes a strong form of dynamical localization (proven much later with o
 ther methods) and it allows for very general deterministic background term
 s in the potential. In my talk I will review the Kunz-Souillard method and
  discuss recent work with D. Damanik\, which uses the Kunz-Souillard appro
 ach to prove localization for continuum one-dimensional Anderson models. I
 n particular\, we can allow for more general background potentials than pr
 evious works.
LOCATION:AAC006
STATUS:CONFIRMED
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