Variational-Hemivariational Inequalities with Applications

Author: Mircea Sofonea (University of Perpignan, France) , Stanislaw Migorski (Jagiellonian University in Krakow, Poland)
Publisher: Taylor & Francis Ltd
Edition: 2nd edition
ISBN:

9781032587165

Pages: 340
Publication Date: 10 December 2024
Format: Hardback
Availability: In Print

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Variational-Hemivariational Inequalities with Applications

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Author: Mircea Sofonea (University of Perpignan, France) , Stanislaw Migorski (Jagiellonian University in Krakow, Poland)
Publisher: Taylor & Francis Ltd
Imprint: Chapman & Hall/CRC
Edition: 2nd edition
Weight: 0.453kg
ISBN:

9781032587165

ISBN 10: 1032587164
Pages: 340
Publication Date: 10 December 2024
Audience: College/higher education , Tertiary & Higher Education
Format: Hardback
Publisher's Status: Active
Availability: In Print

This item will be ordered in for you from one of our suppliers. Upon receipt, we will promptly dispatch it out to you. For in store availability, please contact us.

I. Variational Problems in Solid Mechanics. 1. Elliptic Variational Inequalities. 1.1. Background on functional analysis. 1.2. Existence and uniqueness results. 1.3. Convergence results. 1.4. Optimal control. 1.5. Well-posedness results. 2. History-Dependent Operators. 2.1. Spaces of continuous functions. 2.2. Definitions and basic properties. 2.3. Fixed point properties. 2.4. History-dependent equations in Hilbert spaces. 2.5. Nonlinear implicit equations in Banach spaces. 2.6. History-dependent variational inequalities. 2.7. Relevant particular cases. 3. Displacement-Traction Problems in Solid Mechanics. 3.1. Modeling of displacement-traction problems. 3.2. A displacement-traction problem with locking materials. 3.3. One-dimensional elastic examples. 3.4. Two viscoelastic problems. 3.5. One-dimensional examples. 3.6. A viscoplastic problem. II. Variational-Hemivariational Inequalities. 4. Elements of Nonsmooth Analysis. 4.1. Monotone and pseudomonotone operators. 4.2. Bochner-Lebesgue spaces. 4.3. Subgradient of convex functions. 4.4. Subgradient in the sense of Clarke. 4.5. Mixed equilibrium problem. 4.6. Miscellaneous results. 5. Elliptic Variational-Hemivariational Inequalities. 5.1. An existence and uniqueness result. 5.2. Convergence results. 5.3. Optimal control. 5.4. Penalty methods. 5.5. Well-posedness results. 5.6. Relevant particular cases. 6. History-Dependent Variational-Hemivariational Inequalities. 6.1. An existence and uniqueness result. 6.2. Convergence results. 6.3. Optimal control. 6.4. A penalty method. 6.5. A well-posedness result. 6.6. Relevant particular cases. 7. Evolutionary Variational-Hemivariational Inequalities. 7.1. A class of inclusions with history-dependent operators. 7.2. History-dependent inequalities with unilateral constraints. 7.3. Constrainted differential variational-hemivariational inequalities. 7.4. Relevant particular cases. III. Applications to Contact Mechanics. 8. Static Contact Problems. 8.1. Modeling of static contact problems. 8.2. A contact problem with normal compliance. 8.3. A contact problem with unilateral constraints. 8.4. Convergence and optimal control results. 8.5. A contact problem for locking materials. 8.6. Convergence and optimal control results. 8.7. Penalty methods. 9. Time-Dependent and Quasistatic Contact Problems. 9.1. Physical setting and mathematical models. 9.2. Two time-dependent elastic contact problems. 9.3. A quasistatic viscoplastic contact problem. 9.4. A time-dependent viscoelastic contact problem. 9.5. Convergence and optimal control results. 9.6. A frictional viscoelastic contact problem. 9.7. A quasistatic contact problem with locking materials. 10. Dynamic Contact Problems. 10.1. Mathematical models of dynamic contact. 10.2. A viscoelastic contact problem with normal damped response. 10.3. A unilateral viscoelastic frictional contact problem. 10.4. A unilateral viscoplastic frictionless contact problem.

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Mircea Sofonea earned his PhD from the University of Bucarest, Romania, and his habilitation at the Université Blaise Pascal of Clermont-Ferrand (France).He is currently a Distinguished Profesor of Applied Mathematics at the University of Perpignan Via Domitia, France and a honorary member of the Institute of Mathematics, Romanian Academy of Sciences. His areas of interest and expertise include multivalued operators, variational and hemivariational inequalities, solid mechanics, contact mechanics and numerical methods for partial differential equations. Most of his reseach is dedicated to the Mathematical Theory of Contact Mechanics, of which he is one of the main contributors. His ideas and results were published in nine books, four monographs, and more than three hundred research articles. Stanislaw Migórski earned his PhD degree and the habilitation from the Jagiellonian University in Krakow, Poland. He is currently a Full Honorary Professor and Chair of Optimization and Control Theory at Jagiellonian University in Krakow. His areas of interest and expertise include mathematical analysis, differential equations, mathematical modelling, methods and technics of nonlinear analysis, homogenization, control theory, computational methods and pplications of partial differential equations to mechanics. His research results are internationally recognized and were published in six books, four monographs, and more than two hundred research articles.

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