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LA Probability Forum

Thursday, November 2, 2023
5:00pm to 6:00pm
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Convergence of effective resistances on generalized Sierpinski carpets
Shiping Cao, Department of Mathematics, University of Washington,

UCLA, Math Sciences Bldg., Room 6627

The locally symmetric diffusions, also known as Brownian motions, on generalized Sierpinski carpets were constructed by Barlow and Bass in 1989. On a fixed carpet, by the uniqueness theorem (Barlow-Bass-Kumagai-Teplyaev, 2010), the reflected Brownians motion on level $n$ approximation Euclidean domain, running at speed $\lambda_n\asymp \eta^n$ with $\eta$ being a constant depending on the fractal, converges weakly to the Brownian motion on the Sierpinski carpet as $n$ tends to infinity. In this talk, we show the convergence of $\lambda_n/\eta^n$. We also give a positive answer to a closely related open question of Barlow-Bass (1990) about the convergence of the renormalized effective resistances between two opposite faces of approximation domains. This talk is based on a joint work with Zhen-Qing Chen.

For more information, please contact Math Dept by phone at 626-395-4335 or by email at [email protected].