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E-raamat: Variational Inequalities and Frictional Contact Problems

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Variational Inequalities and Frictional Contact ProblemsSuurem pilt
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Variational Inequalities and Frictional Contact Problems contains a carefully selected collection of results on elliptic and evolutionary quasi-variational inequalities including existence, uniqueness, regularity, dual formulations, numerical approximations and error estimates ones. By using a wide range of methods and arguments, the results are presented in a constructive way, with clarity and well justified proofs. This approach makes the subjects accessible to mathematicians and applied mathematicians. Moreover, this part of the book can be used as an excellent background for the investigation of more general classes of variational inequalities. The abstract variational inequalities considered in this book cover the variational formulations of many static and quasi-static contact problems. Based on these abstract results, in the last part of the book, certain static and quasi-static frictional contact problems in elasticity are studied in an almost exhaustive way. The readers will find a systematic and unified exposition on classical, variational and dual formulations, existence, uniqueness and regularity results, finite element approximations and related optimal control problems. This part of the book is an update of the Signorini problem with nonlocal Coulomb friction, a problem little studied and with few results in the literature. Also, in the quasi-static case, a control problem governed by a bilateral contact problem is studied. Despite the theoretical nature of the presented results, the book provides a background for the numerical analysis of contact problems.

The materials presented are accessible to both graduate/under graduate students and to researchers in applied mathematics, mechanics, and engineering. The obtained results have numerous applications in mechanics, engineering and geophysics. The book contains a good amount of original results which, in this unified form, cannot be found anywhere else.

Arvustused

This important book is unique in that it presents a profound mathematical analysis of general contact problems. The monograph is written in an accessible and self-contained manner. It will be of interest to research mathematicians and science engineers working in solid and fluid mechanics and in optimization theory of partial differential equations. Moreover, it is suitable as a textbook for graduate courses in optimization of elliptic systems. (Ján Lovíek, Mathematical Reviews, April, 2015)

1 Introduction
1(8)
References
4(5)
Part I Preliminaries
2 Spaces of Real-Valued Functions
9(12)
References
19(2)
3 Spaces of Vector-Valued Functions
21(10)
References
28(3)
Part II Variational Inequalities
4 Existence and Uniqueness Results
31(52)
4.1 Elliptic Variational Inequalities
31(14)
4.1.1 Variational Inequalities with Linear Operators
31(10)
4.1.2 Variational Inequalities with Nonlinear Operators
41(4)
4.2 Elliptic Quasi-variational Inequalities
45(18)
4.2.1 Quasi-variational Inequalities with Hemicontinuous Operators
45(6)
4.2.2 Quasi-variational Inequalities with Potential Operators
51(8)
4.2.3 Example
59(4)
4.3 Implicit Evolutionary Quasi-variational Inequalities
63(20)
References
81(2)
5 Some Properties of Solutions
83(18)
5.1 A Maximum Principle for a Class of Variational Inequalities
83(9)
5.1.1 A General Result
83(5)
5.1.2 Examples
88(4)
5.2 Regularity Properties
92(9)
5.2.1 Notation and Preliminary Results
92(2)
5.2.2 Setting of the Problem and Regularity Results
94(5)
References
99(2)
6 Dual Formulations of Quasi-Variational Inequalities
101(14)
6.1 Convex Analysis Background
102(8)
6.2 M--CD--M Theory of Duality
110(5)
References
114(1)
7 Approximations of Variational Inequalities
115(20)
7.1 Internal Approximation of Elliptic Variational Inequalities
115(6)
7.2 Abstract Error Estimate
121(3)
7.3 Discrete Approximation of Implicit Evolutionary Inequalities
124(11)
References
131(4)
Part III Contact Problems with Friction in Elasticity
8 Static Problems
135(56)
8.1 Classical Formulation
135(5)
8.2 Displacement Variational Formulation
140(5)
8.3 Existence and Uniqueness Results
145(4)
8.4 A Regularity Result
149(2)
8.5 Dual Formulations for the Frictional Contact Problem (P)
151(10)
8.6 Approximation of the Problem in Displacements
161(4)
8.7 Approximation of Dual Problems by Equilibrium Finite Element Method
165(9)
8.8 An Optimal Control Problem
174(17)
References
188(3)
9 Quasistatic Problems
191(42)
9.1 Classical and Variational Formulations
191(13)
9.2 Discrete Approximation
204(2)
9.3 Optimal Control of a Frictional Bilateral Contact Problem
206(27)
9.3.1 Setting of the Problem
206(13)
9.3.2 Regularized Problems and Optimality Conditions
219(12)
References
231(2)
Index 233
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