Constructal view of the scaling laws of street networks — the dynamics behind geometry
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Abstract
The distributions of street lengths and nodes follow inverse-power distribution laws. That means that the smaller the network
components, the more numerous they have to be. In addition, street networks show geometrical self-similarities over a range of
scales. Based on these features many authors claim that street networks are fractal in nature. What we show here is that both the
scaling laws and self-similarity emerge from the underlying dynamics, together with the purpose of optimizing flows of people and
goods in time, as predicted by the Constructal Law. The results seem to corroborate the prediction that cities’ fractal dimension approaches 2 as they develop and become more complex.
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15. A Heitor Reis, 2008, Constructal view of the scaling laws of street networks — the dynamics behind geometry, Physica A, 387, 617–622, doi:10.1016/j.physa.2007.10.003.