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Research Report SRR98-008
Asymptotically one-dimensional diffusion on the Sierpinski gasket and multi-type branching processes with varying environment
Ben Hambly and Owen Dafydd Jones
Abstract:
Asymptotically one-dimensional diffusions on the Sierpinski gasket
constitute a one parameter family of processes with significantly
different behaviour to the Brownian motion. Due to homogenization
effects they behave globally like the Brownian motion, yet locally they
have a preferred direction. We calculate the spectral dimension for these
processes and obtain short time heat kernel estimates in the Euclidean
metric. The results are derived using branching process techniques, and
we give estimates for the left tail of the limiting distribution for a
supercritical multi-type branching process with varying environment.
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