10-17-2014, 08:37 PM
(This post was last modified: 10-17-2014, 08:56 PM by amindoxiti.)
Mathematical Elasticity, Volume 1: Three Dimensional Elasticity
Author: Philippe G. Ciarlet | Size: 7 MB | Format: PDF | Quality: Unspecified | Publisher: Elsevier | Year: 1988 | pages: 476 | ISBN: 044481776X ISBN13: 9780444817761
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This volume is a thorough introduction to contemporary research in elasticity, and may be used as a working textbook at the graduate level for courses in pure or applied mathematics or in continuum mechanics. It provides a thorough description (with emphasis on the nonlinear aspects) of the two competing mathematical models of three-dimensional elasticity, together with a mathematical analysis of these models. The book is as self-contained as possible.
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***************************************Mathematical Elasticity, Volume 2: Theory of Plates
Author: Philippe G. Ciarlet | Size: 17 MB | Format: PDF | Quality: Unspecified | Publisher: Elsevier | Year: 1997 | pages: 561 | ISBN: 0444825703 ISBN13: 9780444825704
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The objective of Volume II is to show how asymptotic methods, with the thickness as the small parameter, indeed provide a powerful means of justifying two-dimensional plate theories. More specifically, without any recourse to any a priori assumptions of a geometrical or mechanical nature, it is shown that in the linear case, the three-dimensional displacements, once properly scaled, converge in H1 towards a limit that satisfies the well-known two-dimensional equations of the linear Kirchhoff-Love theory; the convergence of stress is also established.In the nonlinear case, again after ad hoc scalings have been performed, it is shown that the leading term of a formal asymptotic expansion of the three-dimensional solution satisfies well-known two-dimensional equations, such as those of the nonlinear Kirchhoff-Love theory, or the von K?rm?n equations. Special attention is also given to the first convergence result obtained in this case, which leads to two-dimensional large deformation, frame-indifferent, nonlinear membrane theories. It is also demonstrated that asymptotic methods can likewise be used for justifying other lower-dimensional equations of elastic shallow shells, and the coupled pluri-dimensional equations of elastic multi-structures, i.e., structures with junctions. In each case, the existence, uniqueness or multiplicity, and regularity of solutions to the limit equations obtained in this fashion are also studied.
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***************************************Mathematical Elasticity, Volume 3: Theory of Shells
Author: Philippe G. Ciarlet | Size: 25 MB | Format: PDF | Quality: Unspecified | Publisher: Elsevier | Year: 2000 | pages: 662 | ISBN: 0444828915 ISBN13: 9780444828910
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The objective of Volume III is to lay down the proper mathematical foundations of the two-dimensional theory of shells. To this end, it provides, without any recourse to any a priori assumptions of a geometrical or mechanical nature, a mathematical justification of two-dimensional nonlinear and linear shell theories, by means of asymptotic methods, with the thickness as the "small" parameter.
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***************************************Hello dear moderators,
the second vol had been posted before but because of new title for 3 vol I made new thread,please merge these two threads and delete my post.
second vol link:
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***************************************regard
amin
Do not worry about your difficulties in Mathematics, I can assure you mine are still greater. -Albert Einstein
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