J |
Reddy, J. N. (Hrsg.)
(1993):
An introduction to the finite element method.
2. ed.. Aufl./Vol..
Erscheinungsjahr/Year: 1993.
Verlag/Publisher: McGraw-Hill,
New York [u.a.].
[Kurzfassung] [BibTeX]
[Endnote]
For final year graduate and postgraduate courses in the finite element method, this book introduces the method as applied to linear, non-linear and one- and two-dimensional problems of engineering and applied sciences. It includes a step-by-step systematic approach to the formulation and analysis of differential and integral equations in variational forms. The book adopts a differential equation approach, avoiding the need for knowledge of the variational principles of solid mechanics in the development of the finite element models. The need for the weighted-integral formulation of differential equations is explained clearly, providing the student with logical reasons for the recasting of differential equations into variational form. Summary hebis
@book{reddy1993introduction,
author = {Reddy, Junuthula Narasimha},
title = {An introduction to the finite element method},
series = {An introduction to the finite element method J. N. Reddy [Hauptbd.]McGraw-Hill series in mechanical engineering},
publisher = {McGraw-Hill},
address = {New York [u.a.]},
year = {1993},
volume = {[Hauptbd.]. },
edition = {2. ed.},
isbn = {9780070513556},
keywords = {FEM},
abstract = {For final year graduate and postgraduate courses in the finite element method, this book introduces the method as applied to linear, non-linear and one- and two-dimensional problems of engineering and applied sciences. It includes a step-by-step systematic approach to the formulation and analysis of differential and integral equations in variational forms. The book adopts a differential equation approach, avoiding the need for knowledge of the variational principles of solid mechanics in the development of the finite element models. The need for the weighted-integral formulation of differential equations is explained clearly, providing the student with logical reasons for the recasting of differential equations into variational form. Summary hebis}
}
%0 = book
%A = Reddy, Junuthula Narasimha
%C = New York [u.a.]
%D = 1993
%I = McGraw-Hill
%T = An introduction to the finite element method
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