Scaling and universality in the micro-structure ofurban space

We present a broad, phenomenological picture of the distribution of the length of open space linear segments, l, derived from maps of 36 cities in 14 different countries. By scaling the Zipf plot of l, we obtain two master curves for a sample of cities, which are not a function of city size. We show that a third class of cities is not easily classifiable into these two universality classes. The cumulative distribution of l displays power-law tails with two distinct exponents, αB = 2 and αR = 3. We suggest a link between our data and the possibility of observing and modeling urban geometric structures using Levy processes.

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