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Measuring Shape with Topology

We propose a measure of shape which is appropriate for the study of a complicated geometric structure, defined using the topology of neighborhoods of the structure. One aspect of this measure gives a new notion of fractal dimension. We demonstrate the utility and computability of this measure by applying it to branched polymers, Brownian trees, and self-avoiding random walks.

preprint2010arXivOpen access

Robert MacPherson Benjamin Schweinhart

math.AT cond-mat.mtrl-sci math-ph math.MP Computational Geometry

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Robert MacPherson Benjamin Schweinhart

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