Notice bibliographique
- Notice
Type(s) de contenu et mode(s) de consultation : Texte noté : électronique
Auteur(s) : Rand, Omri (1954-....)
Titre(s) : Analytical methods in anisotropic elasticity [Texte électronique] : with symbolic computational tools / Omri Rand, Vladimir Rovenski
Publication : Boston : Birkhäuser, cop. 2005
Description matérielle : 1 online resource (xviii, 451 pages)
Note(s) : Includes bibliographical references (pages 429-446) and index
"This comprehensive textbook/reference focuses on the mathematical techniques and
solution methodologies required to establish the foundations of anisotropic elasticity
and provides the theoretical background for composite material analysis. Specific
attention is devoted to the potential of modern symbolic computational tools to support
highly complex analytical solutions and their contribution to the rigor, analytical
uniformity and exactness of the derivation." "Analytical Methods in Anisotropic Elasticity
will appeal to a broad audience involved in mathematical modeling, all of whom must
have good mathematical skills: graduate students and professors in courses on elasticity
and solid-mechanics labs/seminars, applied mathematicians and numerical analysts,
scientists and researchers. Engineers involved in aeronautical and space, maritime
and mechanical design of composite material structures will find this an excellent
hands-on reference text as well. All will benefit from the classical and advanced
solutions that are derived and presented using symbolic computational techniques."--Jacket
Autre(s) auteur(s) : Rovenskii, Vladimir Y. (1953-....). Fonction indéterminée
Sujet(s) : Élasticité
Anisotropie
Anisotropie -- Modèles mathématiques
Milieux hétérogènes (physique)
Indice(s) Dewey :
531.382 (23e éd.) = Élasticité
Identifiants, prix et caractéristiques : ISBN 9780817644208
Identifiant de la notice : ark:/12148/cb44651642x
Notice n° :
FRBNF44651642
(notice reprise d'un réservoir extérieur)
Table des matières : Fundamentals of Anisotropic Elasticity and Analytical Methodologies ; Anisotropic
Materials ; Plane Deformation Analysis ; Solution Methodologies ; Foundations of
Anisotropic Beam Analysis ; Beams of General Anisotropy ; Homogeneous, Uncoupled
Monoclinic Beams ; Non-Homogeneous Plane and Beam Analysis ; Solid Coupled Monoclinic
Beams ; Thin-Walled Coupled Monoclinic Beams ; Program Descriptions.