A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation
| Autor(a) principal: | |
|---|---|
| Data de Publicação: | 2006 |
| Outros Autores: | , |
| Tipo de documento: | Artigo |
| Idioma: | eng |
| Título da fonte: | Brazilian Journal of Physics |
| Texto Completo: | http://old.scielo.br/scielo.php?script=sci_arttext&pid=S0103-97332006000500030 |
Resumo: | In this work we introduce a method to study stochastic growth equations, which follows a dynamics based on cellular automata modeling. The method defines an interface growth process that depends on height differences between neighbors. The growth rules assign a probability p i(t) for site i to receive a particle at time t, where p i(t) = rho exp[<FONT FACE=Symbol>kG</FONT>i(t)]. Here r and k are two parameters and gammai(t) is a kernel that depends on height h i(t) of site i and on heights of its neighbors, at time t. We specify the functional form of this kernel by the discretization of the deterministic part of the equation that describes some growth process. In particular, we study the Edwards-Wilkinson (EW) equation which describes growth processes where surface relaxation plays a major role. In this case we have a Laplacian term dominating in the growth equation and gammai(t) = h i+1(t)+h i-1(t)-2h i(t), which follows from the discretization of <FONT FACE=Symbol>Ñ</FONT>2h. By means of simulations and statistical analysis of the height distributions of the profiles, we obtain the roughening exponents, beta, alpha and z, whose values confirm that the processes defined by the method are indeed in the universality class of the original growth equation. |
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A new method to study stochastic growth equations: application to the Edwards-Wilkinson equationCellular AutomataInterface GrowthDynamic ScalingIn this work we introduce a method to study stochastic growth equations, which follows a dynamics based on cellular automata modeling. The method defines an interface growth process that depends on height differences between neighbors. The growth rules assign a probability p i(t) for site i to receive a particle at time t, where p i(t) = rho exp[<FONT FACE=Symbol>kG</FONT>i(t)]. Here r and k are two parameters and gammai(t) is a kernel that depends on height h i(t) of site i and on heights of its neighbors, at time t. We specify the functional form of this kernel by the discretization of the deterministic part of the equation that describes some growth process. In particular, we study the Edwards-Wilkinson (EW) equation which describes growth processes where surface relaxation plays a major role. In this case we have a Laplacian term dominating in the growth equation and gammai(t) = h i+1(t)+h i-1(t)-2h i(t), which follows from the discretization of <FONT FACE=Symbol>Ñ</FONT>2h. By means of simulations and statistical analysis of the height distributions of the profiles, we obtain the roughening exponents, beta, alpha and z, whose values confirm that the processes defined by the method are indeed in the universality class of the original growth equation.Sociedade Brasileira de Física2006-09-01info:eu-repo/semantics/articleinfo:eu-repo/semantics/publishedVersiontext/htmlhttp://old.scielo.br/scielo.php?script=sci_arttext&pid=S0103-97332006000500030Brazilian Journal of Physics v.36 n.3a 2006reponame:Brazilian Journal of Physicsinstname:Sociedade Brasileira de Física (SBF)instacron:SBF10.1590/S0103-97332006000500030info:eu-repo/semantics/openAccessMattos,T. G.Moreira,J. G.Atman,A. P. F.eng2006-10-23T00:00:00Zoai:scielo:S0103-97332006000500030Revistahttp://www.sbfisica.org.br/v1/home/index.php/pt/ONGhttps://old.scielo.br/oai/scielo-oai.phpsbfisica@sbfisica.org.br||sbfisica@sbfisica.org.br1678-44480103-9733opendoar:2006-10-23T00:00Brazilian Journal of Physics - Sociedade Brasileira de Física (SBF)false |
| dc.title.none.fl_str_mv |
A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation |
| title |
A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation |
| spellingShingle |
A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation Mattos,T. G. Cellular Automata Interface Growth Dynamic Scaling |
| title_short |
A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation |
| title_full |
A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation |
| title_fullStr |
A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation |
| title_full_unstemmed |
A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation |
| title_sort |
A new method to study stochastic growth equations: application to the Edwards-Wilkinson equation |
| author |
Mattos,T. G. |
| author_facet |
Mattos,T. G. Moreira,J. G. Atman,A. P. F. |
| author_role |
author |
| author2 |
Moreira,J. G. Atman,A. P. F. |
| author2_role |
author author |
| dc.contributor.author.fl_str_mv |
Mattos,T. G. Moreira,J. G. Atman,A. P. F. |
| dc.subject.por.fl_str_mv |
Cellular Automata Interface Growth Dynamic Scaling |
| topic |
Cellular Automata Interface Growth Dynamic Scaling |
| description |
In this work we introduce a method to study stochastic growth equations, which follows a dynamics based on cellular automata modeling. The method defines an interface growth process that depends on height differences between neighbors. The growth rules assign a probability p i(t) for site i to receive a particle at time t, where p i(t) = rho exp[<FONT FACE=Symbol>kG</FONT>i(t)]. Here r and k are two parameters and gammai(t) is a kernel that depends on height h i(t) of site i and on heights of its neighbors, at time t. We specify the functional form of this kernel by the discretization of the deterministic part of the equation that describes some growth process. In particular, we study the Edwards-Wilkinson (EW) equation which describes growth processes where surface relaxation plays a major role. In this case we have a Laplacian term dominating in the growth equation and gammai(t) = h i+1(t)+h i-1(t)-2h i(t), which follows from the discretization of <FONT FACE=Symbol>Ñ</FONT>2h. By means of simulations and statistical analysis of the height distributions of the profiles, we obtain the roughening exponents, beta, alpha and z, whose values confirm that the processes defined by the method are indeed in the universality class of the original growth equation. |
| publishDate |
2006 |
| dc.date.none.fl_str_mv |
2006-09-01 |
| dc.type.driver.fl_str_mv |
info:eu-repo/semantics/article |
| dc.type.status.fl_str_mv |
info:eu-repo/semantics/publishedVersion |
| format |
article |
| status_str |
publishedVersion |
| dc.identifier.uri.fl_str_mv |
http://old.scielo.br/scielo.php?script=sci_arttext&pid=S0103-97332006000500030 |
| url |
http://old.scielo.br/scielo.php?script=sci_arttext&pid=S0103-97332006000500030 |
| dc.language.iso.fl_str_mv |
eng |
| language |
eng |
| dc.relation.none.fl_str_mv |
10.1590/S0103-97332006000500030 |
| dc.rights.driver.fl_str_mv |
info:eu-repo/semantics/openAccess |
| eu_rights_str_mv |
openAccess |
| dc.format.none.fl_str_mv |
text/html |
| dc.publisher.none.fl_str_mv |
Sociedade Brasileira de Física |
| publisher.none.fl_str_mv |
Sociedade Brasileira de Física |
| dc.source.none.fl_str_mv |
Brazilian Journal of Physics v.36 n.3a 2006 reponame:Brazilian Journal of Physics instname:Sociedade Brasileira de Física (SBF) instacron:SBF |
| instname_str |
Sociedade Brasileira de Física (SBF) |
| instacron_str |
SBF |
| institution |
SBF |
| reponame_str |
Brazilian Journal of Physics |
| collection |
Brazilian Journal of Physics |
| repository.name.fl_str_mv |
Brazilian Journal of Physics - Sociedade Brasileira de Física (SBF) |
| repository.mail.fl_str_mv |
sbfisica@sbfisica.org.br||sbfisica@sbfisica.org.br |
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1754734863067381760 |