A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos

Detalhes bibliográficos
Autor(a) principal: Mendonça, Flávio dos Ramos de Sousa
Data de Publicação: 2021
Outros Autores: Gómez, Wilber Humberto Vélez, Portela, Artur Antônio de Almeida
Tipo de documento: Artigo
Idioma: eng
Título da fonte: Revista Veras
Texto Completo: https://ojs.brazilianjournals.com.br/ojs/index.php/BRJD/article/view/37279
Resumo: This paper is concerned with new formulations of local meshfree numerical method, for the solution of dynamic problems in linear elasticity, Integrated Local Mesh Free (ILMF) method. The key attribute of local numerical methods is the use of a modeling paradigm based on a node-by-node calculation, to generate the rows of the global system of equations of the body discretization. In the local domain, assigned to each node of a discretization, the work theorem is kinematically formulated, leading thus to an equation of mechanical equilibrium of the local node, that is used by local meshfree method as the starting point of the formulation. The main feature of this paper is the use of a linearly integrated local form of the work theorem. The linear reduced integration plays a key role in the behavior of local numerical methods, since it implies a reduction of the nodal stiffness which, in turn, leads to an increase of the solution accuracy. As a consequence, the derived meshfree and finite element numerical methods become fast and accurate, which is a feature of paramount importance, as far as computational efficiency of numerical methods is concerned. The cantilever beam was analyzed with this technique, in order to assess the accuracy and efficiency of the new local numerical method for dynamic problems with regular and irregular nodal configuration. The results obtained in this work are in perfect agreement with Mesh-Free Local Petrov-Galerkin (MLPG) and the Finite Element Method (FEM) solutions.
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spelling A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicosLocal Meshfree numerical methoddynamic problemsMoving Least Squares (MLS)Integrated Local Mesh Free (ILMF)Mesh-Free Local Petrov-Galerkin (MLPG).This paper is concerned with new formulations of local meshfree numerical method, for the solution of dynamic problems in linear elasticity, Integrated Local Mesh Free (ILMF) method. The key attribute of local numerical methods is the use of a modeling paradigm based on a node-by-node calculation, to generate the rows of the global system of equations of the body discretization. In the local domain, assigned to each node of a discretization, the work theorem is kinematically formulated, leading thus to an equation of mechanical equilibrium of the local node, that is used by local meshfree method as the starting point of the formulation. The main feature of this paper is the use of a linearly integrated local form of the work theorem. The linear reduced integration plays a key role in the behavior of local numerical methods, since it implies a reduction of the nodal stiffness which, in turn, leads to an increase of the solution accuracy. As a consequence, the derived meshfree and finite element numerical methods become fast and accurate, which is a feature of paramount importance, as far as computational efficiency of numerical methods is concerned. The cantilever beam was analyzed with this technique, in order to assess the accuracy and efficiency of the new local numerical method for dynamic problems with regular and irregular nodal configuration. The results obtained in this work are in perfect agreement with Mesh-Free Local Petrov-Galerkin (MLPG) and the Finite Element Method (FEM) solutions.Brazilian Journals Publicações de Periódicos e Editora Ltda.2021-10-13info:eu-repo/semantics/articleinfo:eu-repo/semantics/publishedVersionapplication/pdfhttps://ojs.brazilianjournals.com.br/ojs/index.php/BRJD/article/view/3727910.34117/bjdv7n10-134Brazilian Journal of Development; Vol. 7 No. 10 (2021); 96793-96812Brazilian Journal of Development; Vol. 7 Núm. 10 (2021); 96793-96812Brazilian Journal of Development; v. 7 n. 10 (2021); 96793-968122525-8761reponame:Revista Verasinstname:Instituto Superior de Educação Vera Cruz (VeraCruz)instacron:VERACRUZenghttps://ojs.brazilianjournals.com.br/ojs/index.php/BRJD/article/view/37279/pdfCopyright (c) 2021 Brazilian Journal of Developmentinfo:eu-repo/semantics/openAccessMendonça, Flávio dos Ramos de SousaGómez, Wilber Humberto VélezPortela, Artur Antônio de Almeida2022-02-03T19:58:15Zoai:ojs2.ojs.brazilianjournals.com.br:article/37279Revistahttp://site.veracruz.edu.br:8087/instituto/revistaveras/index.php/revistaveras/PRIhttp://site.veracruz.edu.br:8087/instituto/revistaveras/index.php/revistaveras/oai||revistaveras@veracruz.edu.br2236-57292236-5729opendoar:2024-10-15T16:19:08.694970Revista Veras - Instituto Superior de Educação Vera Cruz (VeraCruz)false
dc.title.none.fl_str_mv A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos
title A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos
spellingShingle A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos
Mendonça, Flávio dos Ramos de Sousa
Local Meshfree numerical method
dynamic problems
Moving Least Squares (MLS)
Integrated Local Mesh Free (ILMF)
Mesh-Free Local Petrov-Galerkin (MLPG).
title_short A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos
title_full A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos
title_fullStr A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos
title_full_unstemmed A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos
title_sort A local meshless analysis of dynamics problems / Uma análise local desordenada dos problemas dinâmicos
author Mendonça, Flávio dos Ramos de Sousa
author_facet Mendonça, Flávio dos Ramos de Sousa
Gómez, Wilber Humberto Vélez
Portela, Artur Antônio de Almeida
author_role author
author2 Gómez, Wilber Humberto Vélez
Portela, Artur Antônio de Almeida
author2_role author
author
dc.contributor.author.fl_str_mv Mendonça, Flávio dos Ramos de Sousa
Gómez, Wilber Humberto Vélez
Portela, Artur Antônio de Almeida
dc.subject.por.fl_str_mv Local Meshfree numerical method
dynamic problems
Moving Least Squares (MLS)
Integrated Local Mesh Free (ILMF)
Mesh-Free Local Petrov-Galerkin (MLPG).
topic Local Meshfree numerical method
dynamic problems
Moving Least Squares (MLS)
Integrated Local Mesh Free (ILMF)
Mesh-Free Local Petrov-Galerkin (MLPG).
description This paper is concerned with new formulations of local meshfree numerical method, for the solution of dynamic problems in linear elasticity, Integrated Local Mesh Free (ILMF) method. The key attribute of local numerical methods is the use of a modeling paradigm based on a node-by-node calculation, to generate the rows of the global system of equations of the body discretization. In the local domain, assigned to each node of a discretization, the work theorem is kinematically formulated, leading thus to an equation of mechanical equilibrium of the local node, that is used by local meshfree method as the starting point of the formulation. The main feature of this paper is the use of a linearly integrated local form of the work theorem. The linear reduced integration plays a key role in the behavior of local numerical methods, since it implies a reduction of the nodal stiffness which, in turn, leads to an increase of the solution accuracy. As a consequence, the derived meshfree and finite element numerical methods become fast and accurate, which is a feature of paramount importance, as far as computational efficiency of numerical methods is concerned. The cantilever beam was analyzed with this technique, in order to assess the accuracy and efficiency of the new local numerical method for dynamic problems with regular and irregular nodal configuration. The results obtained in this work are in perfect agreement with Mesh-Free Local Petrov-Galerkin (MLPG) and the Finite Element Method (FEM) solutions.
publishDate 2021
dc.date.none.fl_str_mv 2021-10-13
dc.type.driver.fl_str_mv info:eu-repo/semantics/article
info:eu-repo/semantics/publishedVersion
format article
status_str publishedVersion
dc.identifier.uri.fl_str_mv https://ojs.brazilianjournals.com.br/ojs/index.php/BRJD/article/view/37279
10.34117/bjdv7n10-134
url https://ojs.brazilianjournals.com.br/ojs/index.php/BRJD/article/view/37279
identifier_str_mv 10.34117/bjdv7n10-134
dc.language.iso.fl_str_mv eng
language eng
dc.relation.none.fl_str_mv https://ojs.brazilianjournals.com.br/ojs/index.php/BRJD/article/view/37279/pdf
dc.rights.driver.fl_str_mv Copyright (c) 2021 Brazilian Journal of Development
info:eu-repo/semantics/openAccess
rights_invalid_str_mv Copyright (c) 2021 Brazilian Journal of Development
eu_rights_str_mv openAccess
dc.format.none.fl_str_mv application/pdf
dc.publisher.none.fl_str_mv Brazilian Journals Publicações de Periódicos e Editora Ltda.
publisher.none.fl_str_mv Brazilian Journals Publicações de Periódicos e Editora Ltda.
dc.source.none.fl_str_mv Brazilian Journal of Development; Vol. 7 No. 10 (2021); 96793-96812
Brazilian Journal of Development; Vol. 7 Núm. 10 (2021); 96793-96812
Brazilian Journal of Development; v. 7 n. 10 (2021); 96793-96812
2525-8761
reponame:Revista Veras
instname:Instituto Superior de Educação Vera Cruz (VeraCruz)
instacron:VERACRUZ
instname_str Instituto Superior de Educação Vera Cruz (VeraCruz)
instacron_str VERACRUZ
institution VERACRUZ
reponame_str Revista Veras
collection Revista Veras
repository.name.fl_str_mv Revista Veras - Instituto Superior de Educação Vera Cruz (VeraCruz)
repository.mail.fl_str_mv ||revistaveras@veracruz.edu.br
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