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DYNAMICAL SYSTEMS SEMINAR DAY
Thursday, November 7, 1996
PROGRAM:
Stephen Morris, University of Toronto
Experiments on Convection Patterns (Boardroom)
Robust Heteroclinic Cycles in Symmetric Systems
Martin Krupa, Technical University, Vienna
Robust Heteroclinic Cycles in Symmetric Systems
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ABSTRACTS:
Stephen Morris: "Experiments on Convection Patterns"
Fluid convection makes a nice laboratory-scale system in which to
do precise studies of pattern formation under nonlinear, non-equilibrium
conditions. I will describe recent work on a couple of convection
experiments, Rayleigh-Benard convection in gases and electrically
driven convection in smectic liquid crystals. In each case, the
system makes a transition to an ordered flow pattern, followed by
a second transition to a chaotic state.
Martin Krupa: "Robust Heteroclinic Cycles in Symmetric Systems"
Heteroclinic cycles do not normally persist in systems of differential
equations without symmetry. However, in symmetric systems, heteroclinic
cycles can be robust under symmetry-preserving perturbations, and
can also be stable in the Liapunov sense. Evidence of such cycles
has been observed in numerical simulations and physical experiments,
for example in rotating convection between two plates and turbulent
flows in a boundary layer. The existence of robust heteroclinic
cycles has been proven theoretically in the unfoldings of some low
codimension bifurcations and in forced symmetry-breaking from a
larger to a smaller symmetry group. This talk will review both theoretical
and applied research on robust heteroclinic cycles.
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