Please use this identifier to cite or link to this item:
http://localhost/handle/Hannan/343
Title: | Finite Element Concepts |
Other Titles: | A Closed-Form Algebraic Development / |
Authors: | Dasgupta, Gautam. ; |
subject: | Engineering;Partial differential equations. ;;Computer mathematics. ;;Mechanical engineering. ;;Civil engineering. ;;Engineering;Mathematical and Computational Engineering. ;;Partial Differential Equations. ;;Computational Science and Engineering. ;;Mechanical Engineering. ;;Civil Engineering. ; |
Year: | 2018 |
place: | New York, NY : |
Publisher: | Springer New York : Imprint: Springer, |
Abstract: | This text presents a highly original treatment of the fundamentals of FEM, developed using computer algebra,ebased on undergraduate-level engineering mathematics and the mechanics of solids. The book is divided into two distinct parts of nine chapters and seven appendices. The first chapter reviews the energy concepts in structural mechanics with bar problems, which is continuedein the next chapter for truss analysis usingeMathematicaeprograms.eThe Courant and Clough triangular elements for scalar potentials and linear elasticity are covered in chapters three and four, followed byefour-node elements. Chapters five and six describe Taigees isoparametric interpolants and Ironees patch test. Rayleigh vector modes, which satisfy point-wise equilibrium, are elaborated on in chapter seven along with successful patch tests in the physical (x,y) Cartesian frame.eChapter eight explains point-wise incompressibility and employs (Moore-Penrose) inversion of rectangular matrices. The final chapter analyzes patch-testsein all directions and introduces five-node elements for linear stresses. Curved boundaries and higher order stresses are addressed ineclosed algebraic form.eAppendices give a short introduction toeMathematica, followed byetruss analysis using symbolic codes that could be used in all FEM problems to assemble element matrices and solve for all unknowns. AlleMathematicaecodes for theoretical formulations and graphics are included with extensive numerical examples. ; |
Description: | Printed edition: ; 9781493974214. ; SpringerLink (Online service) ; |
URI: | http://localhost/handle/Hannan/343 |
ISBN: | 9781493974238 ; 9781493974214 (print) ; |
More Information: | XXXVI, 333 p. 45 illus. ; online resource. ; |
Appears in Collections: | مهندسی مدیریت ساخت |
Files in This Item:
File | Description | Size | Format | |
---|---|---|---|---|
9781493974238.pdf | 7.44 MB | Adobe PDF | Preview File |
Title: | Finite Element Concepts |
Other Titles: | A Closed-Form Algebraic Development / |
Authors: | Dasgupta, Gautam. ; |
subject: | Engineering;Partial differential equations. ;;Computer mathematics. ;;Mechanical engineering. ;;Civil engineering. ;;Engineering;Mathematical and Computational Engineering. ;;Partial Differential Equations. ;;Computational Science and Engineering. ;;Mechanical Engineering. ;;Civil Engineering. ; |
Year: | 2018 |
place: | New York, NY : |
Publisher: | Springer New York : Imprint: Springer, |
Abstract: | This text presents a highly original treatment of the fundamentals of FEM, developed using computer algebra,ebased on undergraduate-level engineering mathematics and the mechanics of solids. The book is divided into two distinct parts of nine chapters and seven appendices. The first chapter reviews the energy concepts in structural mechanics with bar problems, which is continuedein the next chapter for truss analysis usingeMathematicaeprograms.eThe Courant and Clough triangular elements for scalar potentials and linear elasticity are covered in chapters three and four, followed byefour-node elements. Chapters five and six describe Taigees isoparametric interpolants and Ironees patch test. Rayleigh vector modes, which satisfy point-wise equilibrium, are elaborated on in chapter seven along with successful patch tests in the physical (x,y) Cartesian frame.eChapter eight explains point-wise incompressibility and employs (Moore-Penrose) inversion of rectangular matrices. The final chapter analyzes patch-testsein all directions and introduces five-node elements for linear stresses. Curved boundaries and higher order stresses are addressed ineclosed algebraic form.eAppendices give a short introduction toeMathematica, followed byetruss analysis using symbolic codes that could be used in all FEM problems to assemble element matrices and solve for all unknowns. AlleMathematicaecodes for theoretical formulations and graphics are included with extensive numerical examples. ; |
Description: | Printed edition: ; 9781493974214. ; SpringerLink (Online service) ; |
URI: | http://localhost/handle/Hannan/343 |
ISBN: | 9781493974238 ; 9781493974214 (print) ; |
More Information: | XXXVI, 333 p. 45 illus. ; online resource. ; |
Appears in Collections: | مهندسی مدیریت ساخت |
Files in This Item:
File | Description | Size | Format | |
---|---|---|---|---|
9781493974238.pdf | 7.44 MB | Adobe PDF | Preview File |
Title: | Finite Element Concepts |
Other Titles: | A Closed-Form Algebraic Development / |
Authors: | Dasgupta, Gautam. ; |
subject: | Engineering;Partial differential equations. ;;Computer mathematics. ;;Mechanical engineering. ;;Civil engineering. ;;Engineering;Mathematical and Computational Engineering. ;;Partial Differential Equations. ;;Computational Science and Engineering. ;;Mechanical Engineering. ;;Civil Engineering. ; |
Year: | 2018 |
place: | New York, NY : |
Publisher: | Springer New York : Imprint: Springer, |
Abstract: | This text presents a highly original treatment of the fundamentals of FEM, developed using computer algebra,ebased on undergraduate-level engineering mathematics and the mechanics of solids. The book is divided into two distinct parts of nine chapters and seven appendices. The first chapter reviews the energy concepts in structural mechanics with bar problems, which is continuedein the next chapter for truss analysis usingeMathematicaeprograms.eThe Courant and Clough triangular elements for scalar potentials and linear elasticity are covered in chapters three and four, followed byefour-node elements. Chapters five and six describe Taigees isoparametric interpolants and Ironees patch test. Rayleigh vector modes, which satisfy point-wise equilibrium, are elaborated on in chapter seven along with successful patch tests in the physical (x,y) Cartesian frame.eChapter eight explains point-wise incompressibility and employs (Moore-Penrose) inversion of rectangular matrices. The final chapter analyzes patch-testsein all directions and introduces five-node elements for linear stresses. Curved boundaries and higher order stresses are addressed ineclosed algebraic form.eAppendices give a short introduction toeMathematica, followed byetruss analysis using symbolic codes that could be used in all FEM problems to assemble element matrices and solve for all unknowns. AlleMathematicaecodes for theoretical formulations and graphics are included with extensive numerical examples. ; |
Description: | Printed edition: ; 9781493974214. ; SpringerLink (Online service) ; |
URI: | http://localhost/handle/Hannan/343 |
ISBN: | 9781493974238 ; 9781493974214 (print) ; |
More Information: | XXXVI, 333 p. 45 illus. ; online resource. ; |
Appears in Collections: | مهندسی مدیریت ساخت |
Files in This Item:
File | Description | Size | Format | |
---|---|---|---|---|
9781493974238.pdf | 7.44 MB | Adobe PDF | Preview File |