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11:15-13:00:
Rob van den Berg
CWI Amsterdam, Netherlands
Box-crossings in two-dimensional percolation
14:15-16:00:
Silke Rolles,
University of Bielefeld, Germany
Reinforced random walks
Abstracts:
Rob van den Berg
Box-crossings in two-dimensional percolation
Crossing arguments play an important role in 2-dimensional percolation.
After an introduction and discussion of some classical results (including the
RSW theorem) I will present a result with Antal Jarai about the distance between
the lowest crossing and the boundary of the domain, in ordinary percolation at
the critical point.
I will also mention some problems, conjectures and partial results concerning
crossing probabilities in a {\em dependent} percolation model studied with
Rachel Brouwer, and discuss their background and possible implications for a
peculiar infinite-volume epidemics (or forest-fire) model.
Reinforced random walks
Let G be a locally finite graph. All edges are given non-negative numbers as
weights. Reinforced random walk on G is defined as follows: In each step, the
random walker jumps to a neighboring vertex with a probability proportional to
the weight of the traversed
edge. Each time an edge is traversed, its weight is increased by 1.
Although the model may seem somewhat artificial, I will show in the talk that
reinforced random walk arises quite naturally: Its distribution can be
characterized by a few natural properties. Furthermore, I will present a limit
theorem for reinforced random walk on a finite graph. Connections with random
walk in random environment will be shown. Finally, I will discuss recurrence
questions and open problems.
The talk is based on joint work with Mike Keane. References can be found on my
homepage.
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