Weighted Residual Methods

Weighted residual method (WRM) is an approximation technique in which solution of differential equation is approximated by linear combination of trial or shape functions having unknown coefficients. The approximate solution is then substituted in the governing differential equation resulting in erro...

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Podrobná bibliografie
Vydáno v:Advanced Numerical and Semi-Analytical Methods for Differential Equations s. 31 - 43
Hlavní autoři: Chakraverty, Snehashish, Mahato, Nisha, Karunakar, Perumandla, Dilleswar Rao, Tharasi
Médium: Kapitola
Jazyk:angličtina
Vydáno: United States Wiley 2019
John Wiley & Sons, Incorporated
John Wiley & Sons, Inc
Vydání:1
Témata:
boundary value problems
collocation method
Galerkin method
least‐square method
ordinary differential equations
subdomain method
weighted residual methods
Boundary conditions
Shape
IEEE Sections
Force
Method of moments
Standards
ISBN:9781119423423, 1119423422
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Popis
Shrnutí:Weighted residual method (WRM) is an approximation technique in which solution of differential equation is approximated by linear combination of trial or shape functions having unknown coefficients. The approximate solution is then substituted in the governing differential equation resulting in error or residual. Finally, in the WRM the residual is forced to vanish at average points or made as small as possible depending on the weight function in order to find the unknown coefficients. The authors illustrate various WRMs, viz. collocation, subdomain, least‐square, and Galerkin methods applied for solving ordinary differential equations subject to boundary conditions. They also check the efficiency of various WRMs by comparing the solution obtained using collocation, subdomain, least‐square, and Galerkin methods for the boundary value problems. Lastly, the authors present few exercise problems for self‐validation.
ISBN:9781119423423
1119423422
DOI:10.1002/9781119423461.ch3