Universality of fractal to non-fractal morphological transitions in stochastic growth processes
Stochastic growth processes give rise to diverse intricate structures everywhere and across all scales in nature. Despite the seemingly unrelated complex phenomena at their origin, the Laplacian growth theory has succeeded in unifying their treatment under one framework, nonetheless, important aspec...
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Main Authors | , , |
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Format | Journal Article |
Language | English |
Published |
29.05.2016
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Subjects | |
Online Access | Get full text |
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Summary: | Stochastic growth processes give rise to diverse intricate structures
everywhere and across all scales in nature. Despite the seemingly unrelated
complex phenomena at their origin, the Laplacian growth theory has succeeded in
unifying their treatment under one framework, nonetheless, important aspects
regarding fractal to non-fractal morphological transitions, coming from the
competition between screening and anisotropy-driven forces, still lacks a
comprehensive description. Here we provide such unified description,
encompassing all the known characteristics for these transitions, as well as
new universal ones, through the statistical mix of basic models of
particle-aggregation and the introduction of a phenomenological physically
meaningful dimensionality function, that characterizes the fractality of a
symmetry-breaking process induced by a generalized anisotropy-driven force. We
also show that the generalized Laplacian growth (dielectric breakdown) model
belongs to this class. Moreover, our results provide important insights on the
dynamical origins of mono/multi-fractality in pattern formation, that generally
occur in far-from-equilibrium processes. |
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DOI: | 10.48550/arxiv.1605.08967 |