Ebook: Nonlinear Homogenization and its Applications to Composites, Polycrystals and Smart Materials
- Tags: Engineering general, Appl.Mathematics/Computational Methods of Engineering, Structural Mechanics
- Series: NATO Science Series II: Mathematics Physics and Chemistry 170
- Year: 2005
- Publisher: Springer Netherlands
- Edition: 1
- Language: English
- pdf
Although several books and conference proceedings have already appeared dealing with either the mathematical aspects or applications of homogenization theory, there seems to be no comprehensive volume dealing with both aspects. The present volume is meant to fill this gap, at least partially, and deals with recent developments in nonlinear homogenization emphasizing applications of current interest. It contains thirteen key lectures presented at the NATO Advanced Workshop on Nonlinear Homogenization and Its Applications to Composites, Polycrystals and Smart Materials. The list of thirty one contributed papers is also appended.
The key lectures cover both fundamental, mathematical aspects of homogenization, including nonconvex and stochastic problems, as well as several applications in micromechanics, thin films, smart materials, and structural and topology optimization. One lecture deals with a topic important for nanomaterials: the passage from discrete to continuum problems by using nonlinear homogenization methods. Some papers reveal the role of parameterized or Young measures in description of microstructures and in optimal design. Other papers deal with recently developed methods – both analytical and computational – for estimating the effective behavior and field fluctuations in composites and polycrystals with nonlinear constitutive behavior.
All in all, the volume offers a cross-section of current activity in nonlinear homogenization including a broad range of physical and engineering applications. The careful reader will be able to identify challenging open problems in this still evolving field. For instance, there is the need to improve bounding techniques for nonconvex problems, as well as for solving geometrically nonlinear optimum shape-design problems, using relaxation and homogenization methods.
Content:
Front Matter....Pages i-xxi
Topology Optimization with the Homogenization and the Level-Set Methods....Pages 1-13
Thin Films of Active Materials....Pages 15-44
The Passage from Discrete to Continuous Variational Problems: a Nonlinear Homogenization Process....Pages 45-63
Approaches to Nonconvex Variational Problems of Mechanics....Pages 65-105
On G-Compactness of the Beltrami Operators....Pages 107-138
Homogenization and Optimal Design in Structural Mechanics....Pages 139-168
Homogenization and Design of Functionally Graded Composites for Stiffness and Strength....Pages 169-192
Homogenization for Nonlinear Composites in the Light of Numerical Simulations....Pages 193-223
Existence and Homogenization for the Problem ?div a(x, Du)=f When a(x, ?) is a Maximal Monotone Graph in ? for Every x ....Pages 225-228
Optimal Design in 2-D Conductivity for Quadratic Functionals in the Field....Pages 229-246
Linear Comparison Methods for Nonlinear Composites....Pages 247-268
Models of Microstructure Evolution in Shape Memory Alloys....Pages 269-304
Stochastic Homogenization: Convexity and Nonconvexity....Pages 305-347
Back Matter....Pages 349-355
Content:
Front Matter....Pages i-xxi
Topology Optimization with the Homogenization and the Level-Set Methods....Pages 1-13
Thin Films of Active Materials....Pages 15-44
The Passage from Discrete to Continuous Variational Problems: a Nonlinear Homogenization Process....Pages 45-63
Approaches to Nonconvex Variational Problems of Mechanics....Pages 65-105
On G-Compactness of the Beltrami Operators....Pages 107-138
Homogenization and Optimal Design in Structural Mechanics....Pages 139-168
Homogenization and Design of Functionally Graded Composites for Stiffness and Strength....Pages 169-192
Homogenization for Nonlinear Composites in the Light of Numerical Simulations....Pages 193-223
Existence and Homogenization for the Problem ?div a(x, Du)=f When a(x, ?) is a Maximal Monotone Graph in ? for Every x ....Pages 225-228
Optimal Design in 2-D Conductivity for Quadratic Functionals in the Field....Pages 229-246
Linear Comparison Methods for Nonlinear Composites....Pages 247-268
Models of Microstructure Evolution in Shape Memory Alloys....Pages 269-304
Stochastic Homogenization: Convexity and Nonconvexity....Pages 305-347
Back Matter....Pages 349-355
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