Uniqueness and convergence of resistance forms on unconstrained Sierpinski carpets
Abstract
We prove the uniqueness of self-similar D4-symmetric resistance forms on unconstrained Sierpinski carpets (USC's). Moreover, on a sequence of USC's Kn, n≥ 1 converging in Hausdorff metric, we show that the associated diffusion processes converge in distribution if and only if the geodesic metrics on Kn, n≥ 1 are equicontinuous with respect to the Euclidean metric.
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