Dynamic scaling form in wavelet-discriminated Edwards-Wilkinson growth equation
Dynamic scaling form in wavelet-discriminated Edwards-Wilkinson growth equation
We present an analysis of dynamic scaling of the Edwards-Wilkinson growth model from wavelets' perspective. Scaling function for the surface width is determined using wavelets' formalism, by computing the surface width for each wavelet scale, we show that an exact and simple form of the scaling function is obtained. These predictions are confirmed by computer simulation of a growth model described by the EW equation, and by numerical calculations.
11608
Moktadir, Z.
d602f778-3c48-4654-aa20-d55c2e55c4b8
July 2005
Moktadir, Z.
d602f778-3c48-4654-aa20-d55c2e55c4b8
Moktadir, Z.
(2005)
Dynamic scaling form in wavelet-discriminated Edwards-Wilkinson growth equation.
Physical Review E, 72 (1), .
(doi:10.1103/PhysRevE.72.011608).
Abstract
We present an analysis of dynamic scaling of the Edwards-Wilkinson growth model from wavelets' perspective. Scaling function for the surface width is determined using wavelets' formalism, by computing the surface width for each wavelet scale, we show that an exact and simple form of the scaling function is obtained. These predictions are confirmed by computer simulation of a growth model described by the EW equation, and by numerical calculations.
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Published date: July 2005
Organisations:
Nanoelectronics and Nanotechnology
Identifiers
Local EPrints ID: 263729
URI: http://eprints.soton.ac.uk/id/eprint/263729
ISSN: 1539-3755
PURE UUID: 193606c8-339d-46f7-a99a-d0a9ea6a880e
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Date deposited: 22 Mar 2007
Last modified: 14 Mar 2024 07:37
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Author:
Z. Moktadir
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