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Wednesday 08 April 2015, 11:30-12:30
Recurrent random walks in random and quasi-periodic environments on a strip
- π€ Speaker: Goldsheid, I (Queen Mary, University of London)
- π Date & Time: Wednesday 08 April 2015, 11:30 - 12:30
- π Venue: Seminar Room 1, Newton Institute
Abstract
This is joint work with D. DolgopyatWe prove that a recurrent random walk (RW) in random environment (RE) on a strip which does not obey the Sinai law exhibits the Central Limit asymptotic behaviour.
We also show that there exists a collection of proper sub-varieties in the space of transition probabilities such that
1. If RE is stationary and ergodic and the transition probabilities are concentrated on one of sub-varieties from our collection then the CLT holds; 2. If the environment is i.i.d then the above condition is also necessary for the CLT .
As an application of our techniques we prove the CLT for quasi-periodic environments with Diophantine frequencies. One-dimensional RWRE with bounded jumps are a particular case of the strip model.
Series This talk is part of the Isaac Newton Institute Seminar Series series.
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