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Calculus of variations on thin prest...

Lewicka, Marta.

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Calculus of variations on thin prestressed films = asymptotic methods in elasticity /

Record Type:	Electronic resources : Monograph/item
Title/Author:	Calculus of variations on thin prestressed films/ by Marta Lewicka.
Reminder of title:	asymptotic methods in elasticity /
Author:	Lewicka, Marta.
Published:	Cham :Springer International Publishing : : 2023.,
Description:	ix, 448 p. :ill., digital ;24 cm.
[NT 15003449]:	Introduction -- Part I: Tools in Mathematical Analysis -- Γ-Convergence -- Korn's Inequality -- Friesecke-James-Müller's Inequality -- Part II: Dimension Reduction in Classical Elasticity -- Limiting Theories for Elastic Plates and Shells: Nonlinear Bending -- Limiting Theories for Elastic Plates and Shells: Sublinear and Linear -- Linear Theories for Elastic Plates: Linearized Bending -- Infinite Hierarchy of Elastic Shell Models -- Limiting Theories on Elastic Elliptic Shells -- Limiting Theories on Elastic Developable Shells -- Part III: Dimension Reduction in Prestressed Elasticity -- Limiting Theories for Prestressed Films: Nonlinear Bending -- Limiting Theories for Prestressed Films: Von Kármán-like Theory -- Infinite Hierarchy of Limiting Theories for Prestressed Films -- Limiting Theories for Weakly Prestressed Films -- Terminology and Notation -- Index.
Contained By:	Springer Nature eBook
Subject:	Thin films - Elastic properties -
Online resource:	https://doi.org/10.1007/978-3-031-17495-7
ISBN:	9783031174957

Calculus of variations on thin prestressed films = asymptotic methods in elasticity /
Lewicka, Marta.

Calculus of variations on thin prestressed filmsasymptotic methods in elasticity /[electronic resource] :by Marta Lewicka. - Cham :Springer International Publishing :2023. - ix, 448 p. :ill., digital ;24 cm. - Progress in nonlinear differential equations and their applications,v. 1012374-0280 ;. - Progress in nonlinear differential equations and their applications ;v. 101..

Introduction -- Part I: Tools in Mathematical Analysis -- Γ-Convergence -- Korn's Inequality -- Friesecke-James-Müller's Inequality -- Part II: Dimension Reduction in Classical Elasticity -- Limiting Theories for Elastic Plates and Shells: Nonlinear Bending -- Limiting Theories for Elastic Plates and Shells: Sublinear and Linear -- Linear Theories for Elastic Plates: Linearized Bending -- Infinite Hierarchy of Elastic Shell Models -- Limiting Theories on Elastic Elliptic Shells -- Limiting Theories on Elastic Developable Shells -- Part III: Dimension Reduction in Prestressed Elasticity -- Limiting Theories for Prestressed Films: Nonlinear Bending -- Limiting Theories for Prestressed Films: Von Kármán-like Theory -- Infinite Hierarchy of Limiting Theories for Prestressed Films -- Limiting Theories for Weakly Prestressed Films -- Terminology and Notation -- Index.

This monograph considers the analytical and geometrical questions emerging from the study of thin elastic films that exhibit residual stress at free equilibria. It provides the comprehensive account, the details and background on the most recent results in the combined research perspective on the classical themes: in Differential Geometry - that of isometrically embedding a shape with a given metric in an ambient space of possibly different dimension, and in Calculus of Variations - that of minimizing non-convex energy functionals parametrized by a quantity in whose limit the functionals become degenerate. Prestressed thin films are present in many contexts and applications, such as: growing tissues, plastically strained sheets, engineered swelling or shrinking gels, petals and leaves of flowers, or atomically thin graphene layers. While the related questions about the physical basis for shape formation lie at the intersection of biology, chemistry and physics, fundamentally they are of the analytical and geometrical character, and can be tackled using the techniques of the dimension reduction, laid out in this book. The text will appeal to mathematicians and graduate students working in the fields of Analysis, Calculus of Variations, Partial Differential Equations, and Applied Math. It will also be of interest to researchers and graduate students in Engineering (especially fields related to Solid Mechanics and Materials Science), who would like to gain the modern mathematical insight and learn the necessary tools.

ISBN: 9783031174957

Standard No.: 10.1007/978-3-031-17495-7doiSubjects--Topical Terms:

3632364
Thin films
--Elastic properties

LC Class. No.: QC176.84.E5 / L49 2023

Dewey Class. No.: 530.4275015114

Calculus of variations on thin prestressed films = asymptotic methods in elasticity /
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245 1 0 $a Calculus of variations on thin prestressed films $h [electronic resource] : $b asymptotic methods in elasticity / $c by Marta Lewicka.
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505 0 $a Introduction -- Part I: Tools in Mathematical Analysis -- Γ-Convergence -- Korn's Inequality -- Friesecke-James-Müller's Inequality -- Part II: Dimension Reduction in Classical Elasticity -- Limiting Theories for Elastic Plates and Shells: Nonlinear Bending -- Limiting Theories for Elastic Plates and Shells: Sublinear and Linear -- Linear Theories for Elastic Plates: Linearized Bending -- Infinite Hierarchy of Elastic Shell Models -- Limiting Theories on Elastic Elliptic Shells -- Limiting Theories on Elastic Developable Shells -- Part III: Dimension Reduction in Prestressed Elasticity -- Limiting Theories for Prestressed Films: Nonlinear Bending -- Limiting Theories for Prestressed Films: Von Kármán-like Theory -- Infinite Hierarchy of Limiting Theories for Prestressed Films -- Limiting Theories for Weakly Prestressed Films -- Terminology and Notation -- Index.
520 $a This monograph considers the analytical and geometrical questions emerging from the study of thin elastic films that exhibit residual stress at free equilibria. It provides the comprehensive account, the details and background on the most recent results in the combined research perspective on the classical themes: in Differential Geometry - that of isometrically embedding a shape with a given metric in an ambient space of possibly different dimension, and in Calculus of Variations - that of minimizing non-convex energy functionals parametrized by a quantity in whose limit the functionals become degenerate. Prestressed thin films are present in many contexts and applications, such as: growing tissues, plastically strained sheets, engineered swelling or shrinking gels, petals and leaves of flowers, or atomically thin graphene layers. While the related questions about the physical basis for shape formation lie at the intersection of biology, chemistry and physics, fundamentally they are of the analytical and geometrical character, and can be tackled using the techniques of the dimension reduction, laid out in this book. The text will appeal to mathematicians and graduate students working in the fields of Analysis, Calculus of Variations, Partial Differential Equations, and Applied Math. It will also be of interest to researchers and graduate students in Engineering (especially fields related to Solid Mechanics and Materials Science), who would like to gain the modern mathematical insight and learn the necessary tools.
650 0 $a Thin films $x Elastic properties $x Mathematical models. $3 3632364
650 0 $a Asymptotic expansions. $3 526123
650 1 4 $a Calculus of Variations and Optimization. $3 3538813
650 2 4 $a Differential Equations. $3 907890
650 2 4 $a Surfaces, Interfaces and Thin Film. $3 3593580
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