Cargando…

Selection of Radial Basis Functions for the Accuracy of Meshfree Galerkin Method in Rotating Euler–Bernoulli Beam Problem

In this work, the radial basis function approximations are used to improve the accuracy of meshfree Galerkin method. The method is applied to the free vibration problems of non-rotating and rotating Euler–Bernoulli beams. The stiffness and mass matrices are derived by using conventional methods. In...

Descripción completa

Detalles Bibliográficos
Autor principal: Panchore, Vijay
Formato: Online Artículo Texto
Lenguaje:English
Publicado: Springer India 2022
Materias:
Acceso en línea:https://www.ncbi.nlm.nih.gov/pmc/articles/PMC9059461/
https://www.ncbi.nlm.nih.gov/pubmed/35530049
http://dx.doi.org/10.1007/s40819-022-01327-z
_version_ 1784698316914688000
author Panchore, Vijay
author_facet Panchore, Vijay
author_sort Panchore, Vijay
collection PubMed
description In this work, the radial basis function approximations are used to improve the accuracy of meshfree Galerkin method. The method is applied to the free vibration problems of non-rotating and rotating Euler–Bernoulli beams. The stiffness and mass matrices are derived by using conventional methods. In this meshfree method, only six nodes are considered within a single sub-domain. The parameters are varied for different approximations; the results are obtained with different approximations and found accurate. Two new basis function have been developed which are relatively accurate than conventional basis function: the first new basis function is obtained by multiplication of linear function to radial basis function and second new basis function is obtained by multiplying cubuic radial basis function to Gaussian radial basis function. The first few modes show same result that is available in literature using finite element method and higher modes are found very accurate as well. The result are found to be more accurate for first three modes of non-rotating and rotating Euler–Bernoulli beams where the cantilever beam boundary conditions are used; the first three modes do not change with the change in the parameter c of radial basis function.
format Online
Article
Text
id pubmed-9059461
institution National Center for Biotechnology Information
language English
publishDate 2022
publisher Springer India
record_format MEDLINE/PubMed
spelling pubmed-90594612022-05-02 Selection of Radial Basis Functions for the Accuracy of Meshfree Galerkin Method in Rotating Euler–Bernoulli Beam Problem Panchore, Vijay Int J Appl Comput Math Original Paper In this work, the radial basis function approximations are used to improve the accuracy of meshfree Galerkin method. The method is applied to the free vibration problems of non-rotating and rotating Euler–Bernoulli beams. The stiffness and mass matrices are derived by using conventional methods. In this meshfree method, only six nodes are considered within a single sub-domain. The parameters are varied for different approximations; the results are obtained with different approximations and found accurate. Two new basis function have been developed which are relatively accurate than conventional basis function: the first new basis function is obtained by multiplication of linear function to radial basis function and second new basis function is obtained by multiplying cubuic radial basis function to Gaussian radial basis function. The first few modes show same result that is available in literature using finite element method and higher modes are found very accurate as well. The result are found to be more accurate for first three modes of non-rotating and rotating Euler–Bernoulli beams where the cantilever beam boundary conditions are used; the first three modes do not change with the change in the parameter c of radial basis function. Springer India 2022-04-30 2022 /pmc/articles/PMC9059461/ /pubmed/35530049 http://dx.doi.org/10.1007/s40819-022-01327-z Text en © The Author(s), under exclusive licence to Springer Nature India Private Limited 2022 This article is made available via the PMC Open Access Subset for unrestricted research re-use and secondary analysis in any form or by any means with acknowledgement of the original source. These permissions are granted for the duration of the World Health Organization (WHO) declaration of COVID-19 as a global pandemic.
spellingShingle Original Paper
Panchore, Vijay
Selection of Radial Basis Functions for the Accuracy of Meshfree Galerkin Method in Rotating Euler–Bernoulli Beam Problem
title Selection of Radial Basis Functions for the Accuracy of Meshfree Galerkin Method in Rotating Euler–Bernoulli Beam Problem
title_full Selection of Radial Basis Functions for the Accuracy of Meshfree Galerkin Method in Rotating Euler–Bernoulli Beam Problem
title_fullStr Selection of Radial Basis Functions for the Accuracy of Meshfree Galerkin Method in Rotating Euler–Bernoulli Beam Problem
title_full_unstemmed Selection of Radial Basis Functions for the Accuracy of Meshfree Galerkin Method in Rotating Euler–Bernoulli Beam Problem
title_short Selection of Radial Basis Functions for the Accuracy of Meshfree Galerkin Method in Rotating Euler–Bernoulli Beam Problem
title_sort selection of radial basis functions for the accuracy of meshfree galerkin method in rotating euler–bernoulli beam problem
topic Original Paper
url https://www.ncbi.nlm.nih.gov/pmc/articles/PMC9059461/
https://www.ncbi.nlm.nih.gov/pubmed/35530049
http://dx.doi.org/10.1007/s40819-022-01327-z
work_keys_str_mv AT panchorevijay selectionofradialbasisfunctionsfortheaccuracyofmeshfreegalerkinmethodinrotatingeulerbernoullibeamproblem