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11:15-13:00:
Olle Häggström
Topics in percolation and spatial interaction
14:15-16:00:
Bernard Nienhuis
Exact correlations in 2D
critical percolation and in a 1D sandpile model
Abstracts:
Olle Häggström
TOPICS IN PERCOLATION AND SPATIAL
INTERACTION
LECTURE 3: Models for spatial growth and competition
Consider a stochastic particle system on Z^d where the sites are in state 0
(healthy) or 1 (infected), and infected sites infect each neighbor at unit rate.
There is no recovery, and initially there is just one infected site. This is the
so-called Richardson model, which can also be formulated as a first-passage
percolation problem with exponential passage times on the edges. The central
result says, roughly, that the set of infected sites grows linearly in each
direction, and has an asymptotic shape. The shape, however, is not known. I will
discuss this model and also some more recent generalizations, to continuous
space and to models with several types of infection that compete against each
other for space.
Exact correlations in 2D critical percolation and in a 1D sandpile model
Percolation has been studied by physicists and mathematicians for many decades,
and in many forms. It describes a phase transition in porous matter between
macroscopically permeable (or conducting) and impermeable (or isolating) phases.
The archetypical model is simply a completely uncorrelated mixture of permeable
and impermeable elements. In physical systems these elements are pores or
grains, and in models they are typically lattice sites (site percolation) or
edges (bond percolation).
In this lecture I will consider the bond percolation model on a square lattice,
on an L by infinity strip with a variety of boundary conditions, periodic and
otherwise. When the strip is cut into two half-infinite strips, any two sites on
the cut may or may not be connected to each other via the pores in one of the
half strips. These connections collectively for all sites on the cut may be
called a connectivity configuration (CC). Each of these CC occurs with a
characteristic probability or weight. For instance in the two
most probable CC all sites are mutually connected, or none of them are.
It turns out that these probabilities have surprising properties. For instance,
each one is an integer multiple of the weight of the
least probable CC. A very detailed but ill-understood connection has emerged of
these probabilities with the number of Alternating Sign Matrices, a problem in
combinatorics which has received much attention recently. In the lecture this
connection will be presented and many other observations on the critical
percolation probabilities will be given. The results are all in the form of
conjectures, as none of these observations have been proved to date.
The critical state of the two dimensional critical percolation will be shown to
be equivalent to the time evolution of a stochastic process. This process is
very similar to sandpile models that describe the distribution of avalanches in
flowing sand.
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