Title of article
Random Surfaces from Hierarchical Deposition of Debris with Alternating Rescaling Factors
Author/Authors
A. I. Posazhennikova and J. O. Indekeu ، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2001
Pages
13
From page
1123
To page
1135
Abstract
An analytical study of surface profiles that result from hierarchical random
impact of debris on the line is performed in terms of logarithmic fractals theory.
The hierarchical random deposition model is extended for the case of time-
dependent probabilities P (for positioning a hill on the surface) and Q (for
digging a hole) and spatial rescaling factor *. The periodic deposition model is
solved exactly, and the logarithmic fractal roughness of the surface profile is
found to be robust with respect to time-dependent perturbations. The fractal
amplitudes associated with the proliferation of the surface length are compared
with those calculated in the static regime and are shown to have a nontrivial
iInteraction. It is verified that amplitude repulsion, attraction, neutrality, and
auto-repulsion take place. The transient regime is also studied and is shown to
have exponential decay towards the asymptotic regime. Special attention is
devoted to the case of alternating rescaling factors, for which new results are
derived.
Keywords
Fractals , hierarchical models , random deposition models.
Journal title
International Journal of Thermophysics
Serial Year
2001
Journal title
International Journal of Thermophysics
Record number
426768
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